$user = $this->Session->read('Auth.User');
//find the group of logged user
$groupId = $user['Group']['id'];
$viewFile = '/var/www/html/newbusinessage.com/app/View/Articles/view.ctp'
$dataForView = array(
'article' => array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfQAAAGSCAYAAAAVezPNAAAABmJLR0QA/wD/AP+gvaeTAAAAB3RJTUUH2AILDzUzicUEHgAAIABJREFUeJzt3XmcXFWd9/HPudXdSVjClhCEyJaqDhJk0Lg+CCKCguCMopFFAdmS7o7xEWWc0RGn1XF5XEY0pLvT7OKCBBdcUUHjOsiICxJIuqshQAhkAUIIWbqr7u/5oyMESNJV3feeW3Xq+369eKnJ7fs9kk5/69577jmOQrshIiIidS3KegAiIiIydip0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJQFPWA5Dn2IhjC4YBE9Gfj4iIVEiFURtuJRedwdIFjz3nVw9s34tx0Uux+N9xnJzR2EREpA44Cu2W9SAanotOoG/BbTv8/ULHUWB/8TiikBSB5VkPojrmcG7PsZ3CHOz0HBNwjH/2ePZAj+DSVo/fiy04t+vYT0ME7LGd3xmHY5dtjtsdXWiOmgo9e/30d08Hdv7nUGj/LfA6LyMKidlHKPZ8Luth1JdZOQ6cNPGZ/zkhNwErb1P+biKOZrA9iN0EsPFE7IHZLji3D7HbGxfvg7kpOA4FDkQfFvS9WLXOiANXPfshYNvvwyi3K3FpAriJxNGuROUJxOwFbjKOScBkzOVxdjhs84EhcPoklDl3JSOVOYBzl2OmQhcPFpV5kCe2+YUndnhoJfLzxmHlNxDZfCA/pnNJA+mMx/592BnRuuYNWPxNYN+kRlarVOjZGsRy11R0ZPOa7zE46RHgRekOSSRhxflbgFuAAvl5k2FoBs4dBu4osKOBw9EVvKSiM6aP22DW/hQmtwJHgb0WOBU4JOPBJU6Fnin7DsX5ayo6dMmiQVrbr8D4eMqDEknP8Pf74q3/DJtxwd4MtrwWxzEYxwMzUcFLohaV6ede4F7gW8D7mdZ2BM6dhuMcYFq240uGCj1LRm9Vx+fKPZRyH0V/bhKSJVc9Dvx46z/DBb+l+QRwJxJxKsZ+mY5PwjTQczdwN/ApCnOPwdlczGYBLuORjZo+BWdnGcWeX1f1Fff2PoJz301pPCK1YclVj1PsuZFi90X0rZ2Ki0/BcUvWw5JgGf0LfkNf1+k4ew24pVkPaLRU6Flx9FLJZLjni60r+cGI1KpFZfoW/oS+7pMheg3G14BNWY9KAtXXcwcTdnkF2MeBdVkPp1p6bS0bm8lFU1+wkEyl8m134dxLEx5TqL6Ao+e5v1Rez/iJm7jri09nM6SEHdi+FwC7RBFxPPyaT6lcopR76pljmsox9/U+mcn4knbo7D2Imt6NswuBl2U9nCo8DNwHPIGxDmdP4KJ1xLYObA2RW0XZHiUureH+qWugM856wA3t4A/sSfOWTwJzqZOLXxV6Jtw36O96z6i/vLV9NsbCBAfUyNYBjwAP4XiI2IoQ/Zkmd+eoP3AlLd92NrjDcO4gsKmY7Y1z+wB7wzaLw1THcFuvQIynGP738CSwDsc6YvckztbB1v809zi4h7HovooncvrQ2vFKYpuN493AhKyHk6AysByjj8iWEud+zR5DP+HO3qFMR5Vv/ziOA7b5lTKO9c85xqyEuaee82sRQ8CGrQesJ3ZliAaJ4q0fqt2TlC3GRZuJ4k3kypu4d/9VNfGhJt/xJpx9HZic9VBGokLPguNY+rp/O+qvn9GxG4P2EDC21cRkJP9L7M5ioKuY6SgK7Q8wvDhLrdiA4y7gOuKm67a+lpatQ2cfSC7338A7sh5KemwFFl1MseumzIbg9+5gieEP29+mv/vDjOYRZVJa2w/F+AVwaGZjqIAK3b976O+eMeazFNouA/d/ExiP7NxqcB+gv+tbmY2g0P534IjM8nfuKRx/AvdHiO8A7qCv5+HMRtPacTpmnwCmZzaGtJldwdT9OljcWfKendXjPscDGH/DKBLxU/qm/NL71fvBHfvRbD8FjvKaWwUVunfuA/R3fWXMpzl0ToFctIw6fsWizvyYXHRuJrfh62/OxHKMW3F2C+X4Vv/P7mflKEw6HfgPhhetCdF36O+ehe+r1tr5XlwJ7vO0rOlmyaJBb6n5eROJSt/HeIO3zCrUxYP+gGxii30tkTPdt7Af+Hki55JKnEI5vo0ZHbtlPZA6cDCOC8HdRC73GIW2Wym0tzGtzdPSm4vK9Hd/k/4pL8XZmcASP7levYNC+yezHkSG9ge7jMFJSyjMOdFbanH+euKmk6nRn70qdJ+MRTzYPbZ1sZ9zPrcgsXNJJf6JQcZ+d6Wx5MC9EegmcisptH+L/BxPV82dMX09N9A/5UhwH2N4ollIPsL0Oa/IehAZy0N0C4X2zzNzdrOXxOL8LTxdfjvwRy95VVCh+2Qu2ZnpxX1/DNyf6DllBHYe09pnZj2KOpUDzsBFf6PQ8RVeMtvTvgSdMf1dn8Y4E1jrJ9OLHHHuq1kPogZEwL+yPvop08/f3Uviyt6NlMtvxuzvXvIqpEL3xezvDHT9IdmTdsbgtNCMX47IdWQ9iDrXBPZ+Srn7ybf1cuicgpfUYvcihsYVwC0kyxnTibLXkm9/TdajqA3ujdi4Xw1vAOTBfb1Pkms6CRjwklcBFbovUcJX5//gSteilbM8s9PJz5s48nEygnE4dxG56B4K7VdzWNvBqScuv2wd/V1tWyc1ZTcbP0nOnZn1EGqGMRNX+iH7z/azB/qyy1duXf+9Jn4Gq9D92MjguG+kcua+3rXADamcW3ZkV6LyyVkPIiBNwHmU3TIKHV/hyEt2TT2x2P1rLH4TUDuL5IyavTHrEdSYV7Nr7gaO6/SziVWx5y84u9RL1ghU6F64G1h+WXrrAlt0eWrnlu2LeWXWQwhQC9j72fT0X8nPeW3qacWF90D0TrAVqWelK5/1AGrQW1mx6qPe0uLmy4GHvOXtgArdBxenu0xrccGfgdtTzZDncqaJcenJ46LfUOi4hLTXWehf8BtaHpsGfJj6nQU/joM7tMXs8zkupbXDzwfv4vwtOP7LS9ZOqNDT9zf6eu5IPcXQK2x+zYRO/f1JTxPYFyh0/Cz1SV9LFg3S3/0FsLcBG1PNSksTp2U9hBrUhJm/u5d93b2Yy/RuqX4gpc3MzyYq49beCKz2kiUAu3PYGt3qTJ2diOMP5NvaU4/q7/kRRCfD8zYbqQfOTsp6CDXqVRTaT/GW1lz6DJDZBjoq9HRtgOZ0JsM93/Dyh71esmRYXH5T1kNoEA7n5pNv/+fUk/oX/IYofiOOR1PPSpY2atqxf/eWdG/vI+B+4S3veVToaTL7FsX5/j7tl8tXMLxDkfhg7vSsh9BAcji+5eVqa9nCP4G9ghpcCWwn9sp6ADXsaFrb/e2SZnFmbx2p0NOUM79XzPf1Pgj8wGtmI3NB7b9dD3YBfkhr++dSfyWpr+dhrOn1YNemmpMcrYuwYw7z+K5+bvD7ZPReugo9LY47hz/pexZnOymjoRjjsx5CA3IY/8bDq36R+uIhxflb6O85D+c+kWpOMvwspFKvnL3dW9ayq58C9ytvedtQoacnm+fZA12LgXsyyW48ftaNlu05jl1y87wk9XV9Atz3vGSNnp+NSeqVcZTfnRLjn/nLepYKPR1P0ey+mVG24dD67n7oqihLjo8xrcPH7G7DcnPQWyT1LMeW+GhvaS7OZHtVFXo6vsGSrg2ZpTe764CnMstvHLoqytZuRPYDCh3pPx8tzl9DZGcCg6lnSTqc6+bQ2Xt4yerrXUoGewWo0NNgnifDPd/wh4lrMx2DiB/NYNeTn/svqSct6/kljrmp54xO+uvf179DiJpe7THvrx6zABV6Gu6g2POXrAeBxT0Es0WkyE7lcPFVXvZX7+u+EuO/U8+pnp+NSOrfi/1F2RJ/WcNU6EnztTLcSIoL7wH7ZdbDCJyf23dEW/zk1LV9KOWu8JJUXPthIJNnpDJWsZ+90gGI7vWXtTXRd2Dg1rHLbt+u6MjWOW9JeSzg9ApbEJxtznoIdeIUWtvOSD9mUZmhcacDxfSzpG7F8Z8Arx/GVehJMvd17vri0yMeN739SCz6CmnvJLX/lB9RA1v6iXhj7ipa216Ves7yy9Zh8TnU0g5t08/Xa5QjiVy6P3O3NdBzN3CNtzxU6Akrd1d2mLsIyDOtI909nxd3ljCuTDVDpLbsgrmbvLxzXFz4P+BxN6+RDDXp5/mInOcV9czrbXd9AyTn18PPrUcw9eIJRPZuACLOSXtQ5HJXovXdU6QtVGvQi9kSf8hLUkv0MTJ4PUnqReR15z79MEqKs56Kjhu/6TRs60YKzt5Fft64NIfFsstXovXd03PoSt3mrEXOXcIhF05JPWdJ1wYcF+H5WanUCRd7nf+iQk+EW0XzY9+t7FB30TP/3dgLSulvCUlc2YcNkXDsRq75Ui9Jfd0/BXsnek209pn5fV/fnNcFvlToSTC7aut+5Dt32NxW4Njn/Jrj7JRG9az+F90GDKSeI1JLHLPJz57mJau/50fgvu8la0eaW7S4zMj8vq/viH3GqdDHLiYuV/bueRyfzwtntp/MtLZ9Ex/Vc3TG4LJdvU7Ev2bIfdFbmpU/Rpaz3ocGtbhMrTG/HatCH7ufbN2HfOeO62zC3Hu38ztNOHdW4qN6Ple6Gq1DnbyWZv0QrWWOt1Foe4eXrOLCezC+4SVL6oTfWfUq9LFycWWvqq1cdSrY9ifpOA+z3ft61wI3pZ7TaAaHdJuz5rlPc1ynnw9e5j6F3iqRZ6U76fl5VOhjcz99L7qloiONC3fyuy9jWtsRyQxpJxyaHCeNaPrwB2oPBrqKoKv0Gub3bQSzPX3GqdDHwqx3+Pn0CPLzpgI737c5ch6u0rt/C4z8rrxIaIwLvGU1lT8CrPOWJ5VzzvcyyjN8hqnQR28Qmq+q6Eg3dB6QG+God8OskY5JQI1sHiPi10lMf9/+XpLu7X0Es496yZLaNf19h+A4z2ekCn30bqI4f83Ih3VG4M6v4Hz7k9/nhDGPaiRD478GbEw9R6S2NFEupX8X7B+K+y0ElnnLk8pY7O8thHJ8PCNfyCVKhT5azlU2GS6/+gTg4MrOGaX/Tvryy9aBuyH1HJFa49z2XhtNSWeMw98rc1IZY4O3rMjS3atje5G+AwNxN31dv6voyMh2NhnueeztXnZM0uQ4aUwFWttf5y0tbroeWOstT2qL8UrfkSr00bBKr87nTcb4lyrOvAvxuHeOblBV6Ov6X7A/p54jUmvM2r1lFedvwdn13vJkZM75ueW+/+xdgMO9ZG1DhV69DeQ2V/aXNCqdDbRUeX4/z/mc0+Q4aUDuXUxvn+4tLkaFXkuMR7zkTGh6Nb6XmUWFPhpfZ9nVlS24P7pXZY7lkLkHjeLrqtPsvgl43dpPpAbkKLv3eUsr9vwVWO0tT3Yucsu95Djzs+7B86jQq+Uq3LlsetvRjO6WS0STvWcUX1edJV0bcPb11HNEao2zMzzuY28Y+ntWC5zdzO6lP/rJqupRa2JU6NVw/IG+hX+r6NjYjX4hCzM/t92jJk2Oqw/aljNZk8g/+k/e0jaWLwUe8pYn2xc1XcqdvUOp5+TbXgb42eXveVTo1YipdDLcROBdo85xtJJvf82ov75SSy//O44/pJ4jY6VHI0mLON5b1srejRgLvOXJ9mwht8rPugDOzfaSsx0q9MqtpbSpss1NXOksYGybdkSW/jvpALHpKl0aj7nXe877JrrTkiH7I0sWpb/b5PBrx+k/Mt0BFXrlrmH5tZWtA2xjuN3+7DnOYMasamfIV2/zhJuAx1LPEakp7lVe4wa6HgL7i9dM2Ub0XS8xccvHgN28ZG2HCr0yMVau7DWvQsdROHtFApl7M7jPWxM4z86t+PImjOtSzxGpKTaFw9oO9psZ/dhvnmxVZohvp54yrX0muItTz9kJFXolHD+n2DtQ0bFWzcpwIwb7mRzXFC1EtwNHxzWlfxdF0lGKkvjgXTnHD1M9fxO7pHr+uuV+yfKuR9PN6IyI+BbQnG7OzqnQKxFHlT1nnnrxBCLOSjD5ZPLzJid4vu1buqAP41ep54SoOZqQ9RBklJz5ve3e1/UnSHFhk6gl0zKpWRZfmXpG/tFjgULqOSNQoY/sQaZOruxW2fhNp2HslWB2M650RoLn2xlNjpPG4nip50QDfXD27EGm7pfy8/NZOYi+kG5GZVToI7IrWdxZquhQ5y5KPt7Tbfdxa2/GkfJtKZEaYv7X2gb7jf/MRubmV/zze7Ra9/lCQvOmxkyFvnNDNFV4u+awua3AsYmPwNkryM9J/wfPkkWDxFydeo5I7TiQQ2fv4TcyUqH7s46hlnRvtxc6zsSynQi3LRX6zji+z729lT3ziuP09lqOIj9X6eWoF4i9ZInUgqYmv7fd+7vuRWu7++H4GMsvW5fa+VvbjwFL//l8FVToO1OucJvUmbObMffe1MZh9m4va0/fv+ABcLekniNSM8zfErDPRGp1xtQ57qRvbXrzgqZ1/B+MH0NtvVmgQt8ht5SBrsUVHbq+6a1gU1Icy1RaV/lZqtI0OU4aiLmXZ5B6bwaZDcRWEDe9DRals/f59LbjiewnwO6pnH8MVOg71kPl72aPfWW4kfm57V5c8xPgQS9ZIpmzmd4jI7fUe2bjeJJc01sozl+R+Jmnte1Lvv0KYvczwPPci8qo0LdvI0Mtla2elp83FezNKY8HjNOY0eFhScFF5Vp7LiSSohn+J8bFKvQ0OJ4gik9g6eV/T/zc+XmTidwvcVwINCV+/oSo0LfL3VDxZAo3dB6QS3c8AOzKEKd5yGHrzP50X/UQqQ1NRNE7vCZuiO8GVnrNDN/9OI5j2cI/JX7m1rYDcKXFwIzEz50wFfr2uLiyddvpjMCdn+5gtmGxn9vuwzP7f+AlSyRz7p1e41b2bgT3Za+Z4SphXMkWZrKs+65kT90Zke+4AHN/hSzWLKieCv2F/kJfzx0VHZlffQJwcKqjeQ73BqZ1vNhPFLrtLo3B8RLvmWa/854Znlux+J8odl/Eg91PJHrmwtxjKaz6G86uBCYleu4UqdBfwCq8OgeiJDdiqSyRnPnZa7dvys9wPOAlSyRbe3tPHGSZ98xwGLirOWDKyRQX3pPomWfMaqG1/aMQ/ww4ItFze6BCf66naIm+UdGR+XmTMf4l5fG8kHG2n6DOmNiu8ZMlkqmJ3hOHryif8p5bzxwPgPsUVi7Q33VBoku65udNptD+MYYmPYDxaWB8Yuf2qGZn62XkGyzp2lDRkdHQOZjLYuvMl9Da9qqKHwuMSfNVULoUP5P+RLKTnzeR4vz1XjPNluOc7w1i6skGjDtw3EIud0sqs9cLHUcB86B0FjC+3jeRVqFvy8WVL6pi0YWZbSEeu3OA9Au9OH8FhfZbgFNSzxLJ1kTAb6E79yB43/GtVg3g+DO4e4i5G+OvDOx7H3SmsxR1a/vJGB8BOyaV82dEhf6s2+lb+LeKjmzteB1mh6U8nh1znMGMWR9kyaLB1LMsugIXq9Cz5NhY71cONS/e4v/xo7MHsHS2f0jR7cCq6r/MPYWz4VvkxhCwAXNPQbwWi/7IQFf628rm503FlU4Fdw5mr009LwMq9Ge4yifDmfl7VW379mFo0luA76eeNHXyj3l41Upg/9Sz6lEcp78oyfAPQAlNzOqUtnNKT7FndtZDqMhxnU2sfGQG5l6Dc68DjsFKBw3/ZrifjlXow9axady3KzoyP28ilN6V8nhGFnMuPgp9cWeJfPu1OD6aepZII3Hu8UTPV7aa2ijEm6kXT2D84EuI7AiMmcAreXjVURBNAELu7xdQoQNg17Hiy5sqOtSVzgJ2TXc8lYyDt3DY3H1YuuCx1LNyuSuJy/+O3oqQUEXOw7LKz+PcaizBtnHWnNzJalx+3jgYei0uOhs2nwM0NVJx74h+QAMQVXG73fnYiKUSLcTxGV6Sll1+P/BLL1kiWWhqzuBNDkv/w3ioivO3UOxZTH/XBWDvAxYzvKlUQy9ZrSt07Df0d1e2nWGh4yiwV6Q8oMoNv5O+wFNWL44TvGSJNII4ehyXziTuhtLfsxAYvig7rrOJB1fuT1PuIGI7AtzLccxkeJGY4O9gqNCrmQzn4otqbFbqq2mdfRh9venv3jRu7c0MTloDTE49S6QRNJUfp1xTP0/q3/BiMw9u/ee3z/z6jFktlPY+ktj9H4iO2/q6Wt0s6VqpRi/0tbSsvamiI6dePAHbfFbK46lenDsb+I/Uc5YsGqTQfh1wSepZIr7FpQneMzePX0fzFu+xDWn4Fd8/bf3nq4DjsPcdQan8RhxvA46Funvn4AUavNDt6orf5R6/6Z3g9kx5QNVzvAc6L01tAYZtRVxJzIcI4Btf5Lki/6s+jltfJh7nPXZM8vMmMliqbL5BUznmvt4nUx7RaNnWlef+DlxGvu3NOHc5kM94XGPSyIVuxNEVFR/tamYy3PMdyLTVr2eA9BdmWNa9jEL774CgVlcSycSyq5+i0J71KKo09DvGVbpcbY5t/v+VcVtX4jM2Ausw1uFYB24dZutwtg7HoxjLsdz97DJhOXd98ek0/l+8QLHnZ0CBQ+YeRHP8ZszeDe4Y6uzipZEL/TYGuooVHXnY3FbK8bEpj2f0IjsXPBQ6gNlCnFOhiyRjiAaYrAXkMPba+t/3Ag54tipta226Z98ZdzFsehoKHavA+oC7gbtw7m5Kpb+nduV//4IHgF6gl+nvO4Ry6RycmwO8KJW8hDXwa2tW+brtcXw+tf1J7TSOvMTPu/GbJ3wXR7J7D4s0ro1ZD6C22RSG7wi2A92Y/ZZc7nEK7X+h0PEVCh2nMfXidOY/LLv8foo9n2Bi+SCcnQn8NZWcBDVqoT/CAfvdXNGRM2c3Y+696Q5nzHZn49Nv95K04subMHe9lywRX1x5c9ZDkIpFwFFg7wf7DhM29TG97ejU0u7sHaKv5wb6p8zEudlAZTtyZqBBC92urngv3fVNb936KbG2OV/7pAO56EpvWQJQqxOLwuE03bx+uanE7te0dnybae0z08vpjOnrugIrHwXue+nljF4jFnpMKVf5ZDio1clwz3cCrW0HeEkanh16u5cskbDtnvUAApHD7F1E/Il8+20U2k6FznT6rdg7QH/XaZi9gRq7Dd+Ihf7TrRMfRjat48VgJ6U8nqRExO493tLMqvlQJCIvMCtHY/4MTpfjeHA/pLDqTlrb05vAW+xZzAFTXonxGaAmlvxrwG+mKibDufh86unfkeMcb1njohuBp7zliaTJMngueuhe/jeEaSxHYfyaQtt/kdak5sWdJYrd/4HZOdTAOvL1U1bJeJD+x35a2aGdEZE7L93hJO5wps/xs9b8kq4NwDe8ZImkbWiw7D3TRcmuKhOX/f9/qH0O3H9QaF/EjFnpLR5U7PkGFr0TyHQuRmMVunEVLKrsmz6/+gSMg1IeUfLiyN9VehRf5S1LJDRNbq+RD6rmfM01O/u6BryDwcnfG952NSXFBTfjolPIcBZ8IxV6iVyu8tnZkV2Y4ljSdAYzZ/tZqGLZwj+B/dlLVs0q67FDCFyT/920S24f75kNzd6CK93Mwe8dn1pE34LbME7Maq2ORir0H7Ds8pUVHZmfNxnjX1IZ4OM0AAAXJ0lEQVQeT1om82TuZG9pRmO/whY118RkGBkjK633numcdi7078007/KddG+/d99OHJ1ABq+bNk6hWxXbpEZD5wD+N2tIis/JcXH8TcDPessiadltYgYTmsq6Qs+EvYXBSd/a+pZBOooL/kzs3o7nlQAbpdDvo7jvrRUfbVG93m7/h1OZccHeXpKG11S+0UuWSDrK3jYB2ZaL/Pwdle05jcKkz6WaMND1K4wzAW+TFRuj0I3eircXbe14HdhhKY8obeMYbHmXt7TINDkuXVrFLF3ZrMRn7JdJrvzDJeTb/znVhGL3DzD+I9WMbTTCbmuD0HR15YfHR4Gr/Gp+h2wdzqUz0Wb4ndmhnR7jzN+f7bKe31Novxs4wltmI3FuM+Z/zlYDWZdJqjM/KzvKjjku4+D3/pzl16a3ln+x+/MU2o8H3pRaxlaNUOjfpTh/TcVH9/VcDlye3nACZVyF48tZD0OkasayTHIdB6LPaVk7hJYJFwALUswwmsrvpZS7B9gzxZwGuOVuVvlkOBm9puh6QDtWSR1yP8ok1uzATHLluYwO0t4e+97eRzCbw0h3Vsco9EJfRrHn11kPoiEsXfAY8N2shyFSpTJxyf+KhzNnN4N7kfdc2Z7DybelfjucYs+N4D6aZkTohX4V6KaWN9qwReqNMbD1TQ2/1jUdBKT32pRUx0Xv95IzsfQVHJVtDjYKIRf6ILFdl/UgGsrw3ZD+rIchUjHnlmSTy1GZ5MoO2EkcOqeQesydvUMYX0rr9CEX+g8Z6Fmd9SAajGFWxRsFIlmL78kkNjJ/r5VKJSJy0Sf9JG25lpTWew+30GPX2EuSZiXX9DVqYBtBkYpkMcP9wPa96nhp6ZCdTqHjJamnLLv6KXCpzNsIs9AdDzCw78+zHkZDGl4v/5ashyFSkRz3ec8cz0zqeWnpcDmMk7wkxXwtjdOGWeixXVPxynCSPIdWjpP6UG7u855p7uXeM6Uykc3wkjPQ9T/AQ0mfNsSFZWIsqvw5bqH9FBzHpDie2lF2P2Cg6w+p5+xe/jHrm1aBTUk9qyGY/53AGsO6qhadSopjpt69qVExvpb9NszdiLMPJXnSAAvd3cJAVzWffL6EMT214dSSyI4ATk09587eIQrtXwP+NfWsRhCb4dJd96IxuXsziTV7WSa5MjLnswvKV0P0ARJ8fTHEW+6V3+6d3nY0NEiZD3sz09r29ZLkyg0y2920cUr9ust74vTzdwempXLu0pC3Xb0CNon8vIlekooL7wGX6JKzYRW641EO2PcHFR9v7rwUR1OLmoiiM70k9fUuxfi9l6wsDQ5pudt6ZfHf/GeOezVp/dyNLZVXoRpOU+xvFzzHoiRPF1ah465lcWdlr0zN6NgN4/SUB1R7nJ3tL0zvpEsNsyiDQuf13jOlOmWP29o281cSXM00pEI3ylXcbh+0WcBu6Q2nRhkzyc853EvWuOhGUlpAQWSMjKbNf88gV4Ve68z8PJYEWNK1AViR1OnCKXTHYga6ilV8xfmpjaXWRTk/V+lLujbg+LaXLJHqDAwv8OHR1IsnAK/yminVi7y/nZPY5MxwCt2ofGW46e3TgaPTG0yNM3s3dPr5sy873XaX2uO43XvmhM3HA+O850p1Ytvda54lt/9FKIX+OEObKt+60ziPtPe/rW0vpnXNG7wkDb/3ns3rQSI75r/Q4ZQMMqVaLtrFa17EyuROFQT3dZZfW9ls4+M6mzDOSXlAtc/KF/gL01W61JiyCl12wJnfZXmNR5I6VRiFnosqv92+YvXJwIvSG0y9cO+gdfYkL1Fx/DVgyEtWiCI3mPUQArORF0/xO8M933YccKDXTBkdw8976M/kma7Qn+G4k6WXVzFb1Rp3MtxztWBNfv5dDPSsBvcjL1khim1T1kMIzC0Vv96aFOcu9pon9cNFq5I6Vf0XOlxT8ZHT2vbF6bbXs+xCvM0lMG3YIjXC3eQ1rtBxFPBWr5kyeg6/eyeUS48ndap6L/QtNA9+q+Kjo+gcoDm94dSdAq1zj/eSdMCUn0Fykz9ERulhWtZ8x2uisw/S2JNw60uM3yV0m9iY1Knqu9Cdu5klV1Xx6cYabanXkVm5zUvO4s4SzqWyB7BIxcyuYMkif3MSDp29B8Y7vOVJAszv+gTjJyb2SK2+Cz2OK589nW9/DeBnhbS64v6ZQy70s5BCqXw1CS5zKFK1KPa70FEudybg9zUoGRvfk1Dv+uLTSZ2qjgvdVlDc7xdVHK/JcNvXQnOzn3839y3sB/utlyyRF7qLvt6lnjP1c6fuOL9X6Amq30I39zXojCs69shLdsW5xtuIpVLGRd5WjnORJsdJRtyNXuOmtx8JvNJrZtqcC/+NC+Mxr3kJbtdar4VuxPG1FR+9eeM7wPO7hfXlEFpXvdlL0obSTeB5FqkIGM4qn0CbhNh5XLzJm/DXRHC2xmteedOEpE5Vr4X+++HbtxWyOMS/WAmzOV5iVvZuBOf3B2uaXKT90OuCu52+7vu8xeXnTQTTipT1yLHaa964pgYvdHPXVnzsoXMK4I5JbzCBMHcK+XlTvWS5KiYz1jqLt2Q9BKmAs2u95kWlDwF7es2UZFjZ7y13s8RW7KzHQt9AbnPlz8KiqNE3YqlUE1H5Qi9JfT13YJbFXtR1qn4n6dSIB2lee623tGltR2B82FveP0TjKptTJDtToq/Xb6GXc4ktRV6HhW43Vb6P8awcThuxVMziCzius8lPmDZsqZhDP6jHwrlLvb57HrkuYLy3vH+It+iD39g9iO9XayP2S+5UdSdX+VKvhUknAQekN5bQuKmsXHWql6io/HUaYYKNZMv4PX1d13vLa21/G6BHfPWr6D0xjvdP6lT1VugD9C+o5j1mrQxXPT+T4/p61+K42UtWmg7cP7FFISQN9il8XXHNnN2M8TkvWZKWgQwyE7vorLdCv5ZK/3Lm501GGyJUz3gTh872s81jOYDb7r537ZJq3EWx5+fe0p6K3g9M95YnKXD+3oR4JjK575l6KvSYcrnytcCjodMBvxvVhyEi13S2l6SBfX8OPOQlq5655DZvaChmn8fX1fnBHfth7uNesiQ9Ufxn75nOtSZ1qjoqdHcb9/U+WPHhppXhRs/OxcubAZ0xVPEKYqMyhrIeQh0aYOp+vtZtdzTblWS9eNV9vU9mml/vHA+wZfMfvGYe/IE9sYacFFfFe6SHzD0IODq1oYSvwLSO13pJiqJrQLO4JWFmn/H2OKS1/WLgFC9ZWXNsyHoIqTH3EZZf63ehqJYtr0jydPVS6Ot5uvz9io9utjb07vnYuPi9XnKWXX4/2K+8ZCXPz2tCsfO7P3P9W0zxseu8JE1vOxrjs16yaoF53ivcp1x0t/fMmEQfb9ZHoZt9e3jJ0AocNncfzOamPKLwOfcupl6c2JKEI4TV6+Q4P3cWcgFfFSXN8SuGNp0MizwUT2dE7K6hNubqaFvisVnP0lX3eE1sbT8Ux1lJnrI+Cr2aH/ixXQLsnt5YGsYeTNjyNi9Jm8Z/jyze/5TwxFzt7bZpYfXpQMFL1sg8bXhkoe62dqufD4HPcTqQ6EJe9VDot1Psvr3io80S/cTT2OxcLzErvryJ0tDroO6uRMO9/Vifbqe41s/GP63tJ4Mt9JJVU1yYi0FZBhtGmb0z6VPWfqE7PlnxsdPajgD8vEPdGE5k+vsSW8Vop+6/chUOX7OSk+LnA0gca/GakT1F7M72cpXV2j4b44c05p3AEN+4WE9p44+8Jk5/3yHgXp70aWu80O039HX/tOLDXXRiioNpRBFx7PGOR1Rv26r6KdqmJi1es3NljPcw0JX+Y5vp7zsE46tALvWs6vi5W+QsvA+Xjpu9z26P41lpnLa2C92iL1b5BSr0xNm7vUX1rV6M41FveWOnvdBrgdk8it0/SD1n5uxm4vI1wLjUs6rn6XFV5OlZvVdXeM5zYOenceJaLvR7KHZVcRtkVg6nTRFScBTT24/0E7WojHGln6xE+LlaKce6Qt8h9zGKPd0+gngqdxXweg9Zo+Gn0K3u5rmM5C/0dVezP8jYTes4jpSWCK7dQnd8mWpexWjd+whgt9TG08hiu9hbVrl8BVAfBWb8xktOuRTebc4kOPcJ+rs+7SUr3z4fS/ad4UQ51nnJscBuuTt3mffMiEvSO3VteoTmtZWv2w4Q5xJdcUe25c4iP3ual6jh5X3rYxe2yFU+v2MsJpRDuypKwqX0dXV6SWrt+CyO2l7bwpyfQo+snh6JjeRhmtfc4DUxP+e1YCendfoaLXT33yxZVN3rEZH5Waq0MbXgmj7qLS3ms9TDQhlxbpmXnCXrtUb3s8qYddDf/V8eshytbf+N2b97yBobx/96CnrYT44H5v6z6p4Zi6kXT8BFV5HiKqa1WOgDbBq3oOqvMo5IYSzyDDsVOv18vwx03wn82EvW6D1Ocf4aP1GLyvh6Xl/bNmHuDD/PzGflKHRciTl/j5vGIi7f6CkplEJfTHHfa7wmTtj8GeAlaUbUWqEb5jpY8eXRrEZ0aOKjkW3ty7RVL/OWlrN5wGpvedVy/M1zYoizi6uxkig+lmLXTakn5edNpDDpe2nNRE6BUdriZx/vvinLgTq/Y2QriO304d0ePZnW8Qbg/6YdU2OF7nopdv286i878pJdgcnJj0eeIzJ/8xSW9izHotne8qplngvdsdJrXi1x/AFnr2LZwj+lnpVvOxtXuht4a+pZyVnh7z3qzhjD7xajSXPRmQz0+LtYaJ09iciuxcOGYbVU6BuJqfK98602r/e0iUiji/xdoQNMnfxjcEu9ZlbK2R89J/q9PVgbYrBPs/+U19PXk/6t3sLcY3FuIfDi1LOSdZfXtMiqm7BcSxy30Nf1O3+BnRHkrsfTCqa1UuhlsHNGvdJTX+9atMiHB/Yir3GLO0u4+Fxqb830LcTNP/GauHu5F6PPa2a2/kLsjqG/52Pp72veGZFv/zeIbwXq7+LA2de95vXtdyPG771mJqMIdqHXxPyjl2Kc5CuuFgrdwF1If893xngav1vfNaa9vSf29dwBdHrP3bmfUZzv95n2nb1DEJ0JbPGa69+DmF1A/5RXMNCV/q3dQ+YeRGHVbTg+BzSnnpc4t4rBzd/3m9kZQ9PbgX6/uWOymNLQ67zc6fmH1o5zcO4/veWRfaEbZnPp77o2gTOlv/SjZDPTur/708B3M8neLnddJrHFBX8Gdxa1d8ciCZuAD2NNrRR7rvYyYanQdipN8V3AcalnpcY+6H0dcoDi/DVY0/HAcu/Z1THgCxww5UTuv3KVt9TWtrdjdjUenptvK8tCH8Ls3MReQbHoG4S5E1DtMJZklvx0+Wzg1xnlb+su+ru+l1l6f9d3wb2L4QIMxa248svp7/4Cxfnp34E4rrOJfPvHwX0PmJh6XlqM79Pf/c3M8ovzV2DlE3A8kNkYdu4hjLfR3/3h9B/bbKMw50TM3UAGG/hkVegbMHsrxZ7rEzvj8PP3ryR2PnmhCM+39raxsncj0Za3ku2VuhG7fyPrRW/6u75LxGuAuzMdx9gsx9yXsHgG/d0n0tfrY/Kjo9BxGitWLcHxCaDJQ2Y6jJ9C0xlZD4Ni7wCD7jXg/ifroWxjEOOztLjDvWzas61C26kQ3Qy0eM3dylFo9/3D6Q5iu4CBnuR/GM2Y1cKWSd/G8bbEz93ojF9S7H5j1sMAoLXtDMz9PzzNHAW2/gC1z1PsWewtcyTHdTbx8KMXgHs/cHjWwxnBRnC/x+w2iH4x/PjAo2kdbyCyzwCv8ZqbBuNrjFt7kddVzkY0K0d+8vtx9kmy21OjDPY94ugjXrbSfb7W9nO3bi6V2QdFj4Xu/gdXbqdvYdrv7zpa2y/C+BLarCUhtgJrfi3F+SuyHskzpl48gQmbP8TwhLk0b20N4eyD9PVcnmLG2OXbXgbuPThmUyvf945HMa7HRT9j8OnfZ/Ksd1pHnpzN9znTOEUxuI/Q3/X5rAeyQy+Z/SJK0VfBvdNj6mLMrseiXzDQ9ZDH3GcV2v8V+H94fmb+fD4KfTnmvkBx3x6vK/PkZ08jyn0W4x1kP/mvfjl+BXa219mh1SjMOREXfRZjZsJnfgS4GYvnU1xYP29QHNyxH012Lo5TcczA2Mtj+hbM+nAsw0U/p3nNdZldRc6Y1cKWfT6Icx+nHl9Fe64tOP5A7D43qoW3slDoOA2sneEJh2lcsa4DuxMX/Y5S6cvc15vN6nUzLtibwZYrgNMyyX+eNAr9EYw/Ardj3Lp1Xe7s5OdNhqE34aLjwWYyfGuyDl9P8cjxBNhvwHrpW+j3fevRap19GJZ7J/BG4NVU9kN8HcZqItZithJYhrmlEN1DcfJfvX4ATcvBHfsxLp5GOTcJbBKRTQEmYowDdsEYT7TNvytjiB3vrb0esw246GmcrQdbj2M1JVZTjtayfM2arevOZ2fGBXuzpeUiHO8H9s90LNXZAqwFWwXufuA+4D5idxcud6eXyYJpOPgDe9IyeATYYRgHAXtg7EHEBMztCbbtFW0Zt3WJY2MDxkacrYNoHc7WYfYozh4iblnpbx+FnWhtPxmjphYiGkuhrwZbCtG9YEuIbAmDpSVeXw0Yjfy8cVjpCHIuDzYNc9NwdgjGVIb/YMZnPcSUPMnwD+oNwBPAY8BajMfA1uDcKoz7MLvX67KIqeiMmL52P8q2H47dcHELuM2UbRM5nmDQbeTgfdd6nfkq6cnPmwil43B2BrjTgHFZD+l5eoc/MLoncTw5/J+2njJP0JR7nKZ4DUu6tEVuvcjPOZwo+lItPsYZZaG78xJ5d7wW5du/hOODWQ9jzIyLaS5/m6FxT3tfBEXEh/y8yUTlyzF7O7V8161cPoj7eh/MehgyRjNmtTC4z6fAfZAafUNilIOyGppdmbDIDWK1vxX3iByrubf3kayHIZIwR2Huq8DOgtK5GHtkPSBpANPbjmaQr4J7edZD2Zma/JQhIvKM6efvTtzyJojegrO3YPF+WQ9JGsChs/cglzsNOI+YY7IeTiVU6CJSW4Z/kL4O514HdiwxrwBawLJe0kdCd8iFU2hqORn4Z7CTqbM5VSp0EclOft5UXOlY4CU4phPbYTh3OJAL4tGX1LaXzH4RQ9HJRMwkjl6Fs5eD1e1rzip0EfGrdfYkyB2F2XFQagP2AYavvl2m63JIY3C0zp5OnDuJEh/Bse/w9179f4BUoYtIZY68ZFfWPT28RvXug46hlj2f+b04Ho9FE4iiJsz2ANuDiL2GJ63ZHjj2wpgO7qUY+w5/kcpbxujA9uGFk8bbLuDGUYpzuGjrhjtuIo59cDYJ3D6Y7Y1zLwV7FcYeIX77jfY99Bsw/pr4aGqB4yTqejvFrRxXAXdUdrDtTuzS/3AXsQte3hG2FsztmuwpiYhGMaPamEj1S9OOx1W5upkRwahmfE/E7WB8Ro563o2sVph9hMg9XuGxbnjBlSpFL1ikpYKsKr433U7+7hoT2PGz5h1/L/9jcaPt/2YLbgd/h43x1P/qf6nIYnMWERERSVjdPvwXERGRZ6nQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJwP8HGbCJ7Xfk4rQAAAAASUVORK5CYII=" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
[maximum depth reached]
)
),
'Slider' => array()
),
'current_user' => null,
'logged_in' => false
)
$article = array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfQAAAGSCAYAAAAVezPNAAAABmJLR0QA/wD/AP+gvaeTAAAAB3RJTUUH2AILDzUzicUEHgAAIABJREFUeJzt3XmcXFWd9/HPudXdSVjClhCEyJaqDhJk0Lg+CCKCguCMopFFAdmS7o7xEWWc0RGn1XF5XEY0pLvT7OKCBBdcUUHjOsiICxJIuqshQAhkAUIIWbqr7u/5oyMESNJV3feeW3Xq+369eKnJ7fs9kk5/69577jmOQrshIiIidS3KegAiIiIydip0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJQFPWA5Dn2IhjC4YBE9Gfj4iIVEiFURtuJRedwdIFjz3nVw9s34tx0Uux+N9xnJzR2EREpA44Cu2W9SAanotOoG/BbTv8/ULHUWB/8TiikBSB5VkPojrmcG7PsZ3CHOz0HBNwjH/2ePZAj+DSVo/fiy04t+vYT0ME7LGd3xmHY5dtjtsdXWiOmgo9e/30d08Hdv7nUGj/LfA6LyMKidlHKPZ8Luth1JdZOQ6cNPGZ/zkhNwErb1P+biKOZrA9iN0EsPFE7IHZLji3D7HbGxfvg7kpOA4FDkQfFvS9WLXOiANXPfshYNvvwyi3K3FpAriJxNGuROUJxOwFbjKOScBkzOVxdjhs84EhcPoklDl3JSOVOYBzl2OmQhcPFpV5kCe2+YUndnhoJfLzxmHlNxDZfCA/pnNJA+mMx/592BnRuuYNWPxNYN+kRlarVOjZGsRy11R0ZPOa7zE46RHgRekOSSRhxflbgFuAAvl5k2FoBs4dBu4osKOBw9EVvKSiM6aP22DW/hQmtwJHgb0WOBU4JOPBJU6Fnin7DsX5ayo6dMmiQVrbr8D4eMqDEknP8Pf74q3/DJtxwd4MtrwWxzEYxwMzUcFLohaV6ede4F7gW8D7mdZ2BM6dhuMcYFq240uGCj1LRm9Vx+fKPZRyH0V/bhKSJVc9Dvx46z/DBb+l+QRwJxJxKsZ+mY5PwjTQczdwN/ApCnOPwdlczGYBLuORjZo+BWdnGcWeX1f1Fff2PoJz301pPCK1YclVj1PsuZFi90X0rZ2Ki0/BcUvWw5JgGf0LfkNf1+k4ew24pVkPaLRU6Flx9FLJZLjni60r+cGI1KpFZfoW/oS+7pMheg3G14BNWY9KAtXXcwcTdnkF2MeBdVkPp1p6bS0bm8lFU1+wkEyl8m134dxLEx5TqL6Ao+e5v1Rez/iJm7jri09nM6SEHdi+FwC7RBFxPPyaT6lcopR76pljmsox9/U+mcn4knbo7D2Imt6NswuBl2U9nCo8DNwHPIGxDmdP4KJ1xLYObA2RW0XZHiUureH+qWugM856wA3t4A/sSfOWTwJzqZOLXxV6Jtw36O96z6i/vLV9NsbCBAfUyNYBjwAP4XiI2IoQ/Zkmd+eoP3AlLd92NrjDcO4gsKmY7Y1z+wB7wzaLw1THcFuvQIynGP738CSwDsc6YvckztbB1v809zi4h7HovooncvrQ2vFKYpuN493AhKyHk6AysByjj8iWEud+zR5DP+HO3qFMR5Vv/ziOA7b5lTKO9c85xqyEuaee82sRQ8CGrQesJ3ZliAaJ4q0fqt2TlC3GRZuJ4k3kypu4d/9VNfGhJt/xJpx9HZic9VBGokLPguNY+rp/O+qvn9GxG4P2EDC21cRkJP9L7M5ioKuY6SgK7Q8wvDhLrdiA4y7gOuKm67a+lpatQ2cfSC7338A7sh5KemwFFl1MseumzIbg9+5gieEP29+mv/vDjOYRZVJa2w/F+AVwaGZjqIAK3b976O+eMeazFNouA/d/ExiP7NxqcB+gv+tbmY2g0P534IjM8nfuKRx/AvdHiO8A7qCv5+HMRtPacTpmnwCmZzaGtJldwdT9OljcWfKendXjPscDGH/DKBLxU/qm/NL71fvBHfvRbD8FjvKaWwUVunfuA/R3fWXMpzl0ToFctIw6fsWizvyYXHRuJrfh62/OxHKMW3F2C+X4Vv/P7mflKEw6HfgPhhetCdF36O+ehe+r1tr5XlwJ7vO0rOlmyaJBb6n5eROJSt/HeIO3zCrUxYP+gGxii30tkTPdt7Af+Hki55JKnEI5vo0ZHbtlPZA6cDCOC8HdRC73GIW2Wym0tzGtzdPSm4vK9Hd/k/4pL8XZmcASP7levYNC+yezHkSG9ge7jMFJSyjMOdFbanH+euKmk6nRn70qdJ+MRTzYPbZ1sZ9zPrcgsXNJJf6JQcZ+d6Wx5MC9EegmcisptH+L/BxPV82dMX09N9A/5UhwH2N4ollIPsL0Oa/IehAZy0N0C4X2zzNzdrOXxOL8LTxdfjvwRy95VVCh+2Qu2ZnpxX1/DNyf6DllBHYe09pnZj2KOpUDzsBFf6PQ8RVeMtvTvgSdMf1dn8Y4E1jrJ9OLHHHuq1kPogZEwL+yPvop08/f3Uviyt6NlMtvxuzvXvIqpEL3xezvDHT9IdmTdsbgtNCMX47IdWQ9iDrXBPZ+Srn7ybf1cuicgpfUYvcihsYVwC0kyxnTibLXkm9/TdajqA3ujdi4Xw1vAOTBfb1Pkms6CRjwklcBFbovUcJX5//gSteilbM8s9PJz5s48nEygnE4dxG56B4K7VdzWNvBqScuv2wd/V1tWyc1ZTcbP0nOnZn1EGqGMRNX+iH7z/azB/qyy1duXf+9Jn4Gq9D92MjguG+kcua+3rXADamcW3ZkV6LyyVkPIiBNwHmU3TIKHV/hyEt2TT2x2P1rLH4TUDuL5IyavTHrEdSYV7Nr7gaO6/SziVWx5y84u9RL1ghU6F64G1h+WXrrAlt0eWrnlu2LeWXWQwhQC9j72fT0X8nPeW3qacWF90D0TrAVqWelK5/1AGrQW1mx6qPe0uLmy4GHvOXtgArdBxenu0xrccGfgdtTzZDncqaJcenJ46LfUOi4hLTXWehf8BtaHpsGfJj6nQU/joM7tMXs8zkupbXDzwfv4vwtOP7LS9ZOqNDT9zf6eu5IPcXQK2x+zYRO/f1JTxPYFyh0/Cz1SV9LFg3S3/0FsLcBG1PNSksTp2U9hBrUhJm/u5d93b2Yy/RuqX4gpc3MzyYq49beCKz2kiUAu3PYGt3qTJ2diOMP5NvaU4/q7/kRRCfD8zYbqQfOTsp6CDXqVRTaT/GW1lz6DJDZBjoq9HRtgOZ0JsM93/Dyh71esmRYXH5T1kNoEA7n5pNv/+fUk/oX/IYofiOOR1PPSpY2atqxf/eWdG/vI+B+4S3veVToaTL7FsX5/j7tl8tXMLxDkfhg7vSsh9BAcji+5eVqa9nCP4G9ghpcCWwn9sp6ADXsaFrb/e2SZnFmbx2p0NOUM79XzPf1Pgj8wGtmI3NB7b9dD3YBfkhr++dSfyWpr+dhrOn1YNemmpMcrYuwYw7z+K5+bvD7ZPReugo9LY47hz/pexZnOymjoRjjsx5CA3IY/8bDq36R+uIhxflb6O85D+c+kWpOMvwspFKvnL3dW9ayq58C9ytvedtQoacnm+fZA12LgXsyyW48ftaNlu05jl1y87wk9XV9Atz3vGSNnp+NSeqVcZTfnRLjn/nLepYKPR1P0ey+mVG24dD67n7oqihLjo8xrcPH7G7DcnPQWyT1LMeW+GhvaS7OZHtVFXo6vsGSrg2ZpTe764CnMstvHLoqytZuRPYDCh3pPx8tzl9DZGcCg6lnSTqc6+bQ2Xt4yerrXUoGewWo0NNgnifDPd/wh4lrMx2DiB/NYNeTn/svqSct6/kljrmp54xO+uvf179DiJpe7THvrx6zABV6Gu6g2POXrAeBxT0Es0WkyE7lcPFVXvZX7+u+EuO/U8+pnp+NSOrfi/1F2RJ/WcNU6EnztTLcSIoL7wH7ZdbDCJyf23dEW/zk1LV9KOWu8JJUXPthIJNnpDJWsZ+90gGI7vWXtTXRd2Dg1rHLbt+u6MjWOW9JeSzg9ApbEJxtznoIdeIUWtvOSD9mUZmhcacDxfSzpG7F8Z8Arx/GVehJMvd17vri0yMeN739SCz6CmnvJLX/lB9RA1v6iXhj7ipa216Ves7yy9Zh8TnU0g5t08/Xa5QjiVy6P3O3NdBzN3CNtzxU6Akrd1d2mLsIyDOtI909nxd3ljCuTDVDpLbsgrmbvLxzXFz4P+BxN6+RDDXp5/mInOcV9czrbXd9AyTn18PPrUcw9eIJRPZuACLOSXtQ5HJXovXdU6QtVGvQi9kSf8hLUkv0MTJ4PUnqReR15z79MEqKs56Kjhu/6TRs60YKzt5Fft64NIfFsstXovXd03PoSt3mrEXOXcIhF05JPWdJ1wYcF+H5WanUCRd7nf+iQk+EW0XzY9+t7FB30TP/3dgLSulvCUlc2YcNkXDsRq75Ui9Jfd0/BXsnek209pn5fV/fnNcFvlToSTC7aut+5Dt32NxW4Njn/Jrj7JRG9az+F90GDKSeI1JLHLPJz57mJau/50fgvu8la0eaW7S4zMj8vq/viH3GqdDHLiYuV/bueRyfzwtntp/MtLZ9Ex/Vc3TG4LJdvU7Ev2bIfdFbmpU/Rpaz3ocGtbhMrTG/HatCH7ufbN2HfOeO62zC3Hu38ztNOHdW4qN6Ple6Gq1DnbyWZv0QrWWOt1Foe4eXrOLCezC+4SVL6oTfWfUq9LFycWWvqq1cdSrY9ifpOA+z3ft61wI3pZ7TaAaHdJuz5rlPc1ynnw9e5j6F3iqRZ6U76fl5VOhjcz99L7qloiONC3fyuy9jWtsRyQxpJxyaHCeNaPrwB2oPBrqKoKv0Gub3bQSzPX3GqdDHwqx3+Pn0CPLzpgI737c5ch6u0rt/C4z8rrxIaIwLvGU1lT8CrPOWJ5VzzvcyyjN8hqnQR28Qmq+q6Eg3dB6QG+God8OskY5JQI1sHiPi10lMf9/+XpLu7X0Es496yZLaNf19h+A4z2ekCn30bqI4f83Ih3VG4M6v4Hz7k9/nhDGPaiRD478GbEw9R6S2NFEupX8X7B+K+y0ElnnLk8pY7O8thHJ8PCNfyCVKhT5azlU2GS6/+gTg4MrOGaX/Tvryy9aBuyH1HJFa49z2XhtNSWeMw98rc1IZY4O3rMjS3atje5G+AwNxN31dv6voyMh2NhnueeztXnZM0uQ4aUwFWttf5y0tbroeWOstT2qL8UrfkSr00bBKr87nTcb4lyrOvAvxuHeOblBV6Ov6X7A/p54jUmvM2r1lFedvwdn13vJkZM75ueW+/+xdgMO9ZG1DhV69DeQ2V/aXNCqdDbRUeX4/z/mc0+Q4aUDuXUxvn+4tLkaFXkuMR7zkTGh6Nb6XmUWFPhpfZ9nVlS24P7pXZY7lkLkHjeLrqtPsvgl43dpPpAbkKLv3eUsr9vwVWO0tT3Yucsu95Djzs+7B86jQq+Uq3LlsetvRjO6WS0STvWcUX1edJV0bcPb11HNEao2zMzzuY28Y+ntWC5zdzO6lP/rJqupRa2JU6NVw/IG+hX+r6NjYjX4hCzM/t92jJk2Oqw/aljNZk8g/+k/e0jaWLwUe8pYn2xc1XcqdvUOp5+TbXgb42eXveVTo1YipdDLcROBdo85xtJJvf82ov75SSy//O44/pJ4jY6VHI0mLON5b1srejRgLvOXJ9mwht8rPugDOzfaSsx0q9MqtpbSpss1NXOksYGybdkSW/jvpALHpKl0aj7nXe877JrrTkiH7I0sWpb/b5PBrx+k/Mt0BFXrlrmH5tZWtA2xjuN3+7DnOYMasamfIV2/zhJuAx1LPEakp7lVe4wa6HgL7i9dM2Ub0XS8xccvHgN28ZG2HCr0yMVau7DWvQsdROHtFApl7M7jPWxM4z86t+PImjOtSzxGpKTaFw9oO9psZ/dhvnmxVZohvp54yrX0muItTz9kJFXolHD+n2DtQ0bFWzcpwIwb7mRzXFC1EtwNHxzWlfxdF0lGKkvjgXTnHD1M9fxO7pHr+uuV+yfKuR9PN6IyI+BbQnG7OzqnQKxFHlT1nnnrxBCLOSjD5ZPLzJid4vu1buqAP41ep54SoOZqQ9RBklJz5ve3e1/UnSHFhk6gl0zKpWRZfmXpG/tFjgULqOSNQoY/sQaZOruxW2fhNp2HslWB2M650RoLn2xlNjpPG4nip50QDfXD27EGm7pfy8/NZOYi+kG5GZVToI7IrWdxZquhQ5y5KPt7Tbfdxa2/GkfJtKZEaYv7X2gb7jf/MRubmV/zze7Ra9/lCQvOmxkyFvnNDNFV4u+awua3AsYmPwNkryM9J/wfPkkWDxFydeo5I7TiQQ2fv4TcyUqH7s46hlnRvtxc6zsSynQi3LRX6zji+z729lT3ziuP09lqOIj9X6eWoF4i9ZInUgqYmv7fd+7vuRWu7++H4GMsvW5fa+VvbjwFL//l8FVToO1OucJvUmbObMffe1MZh9m4va0/fv+ABcLekniNSM8zfErDPRGp1xtQ57qRvbXrzgqZ1/B+MH0NtvVmgQt8ht5SBrsUVHbq+6a1gU1Icy1RaV/lZqtI0OU4aiLmXZ5B6bwaZDcRWEDe9DRals/f59LbjiewnwO6pnH8MVOg71kPl72aPfWW4kfm57V5c8xPgQS9ZIpmzmd4jI7fUe2bjeJJc01sozl+R+Jmnte1Lvv0KYvczwPPci8qo0LdvI0Mtla2elp83FezNKY8HjNOY0eFhScFF5Vp7LiSSohn+J8bFKvQ0OJ4gik9g6eV/T/zc+XmTidwvcVwINCV+/oSo0LfL3VDxZAo3dB6QS3c8AOzKEKd5yGHrzP50X/UQqQ1NRNE7vCZuiO8GVnrNDN/9OI5j2cI/JX7m1rYDcKXFwIzEz50wFfr2uLiyddvpjMCdn+5gtmGxn9vuwzP7f+AlSyRz7p1e41b2bgT3Za+Z4SphXMkWZrKs+65kT90Zke+4AHN/hSzWLKieCv2F/kJfzx0VHZlffQJwcKqjeQ73BqZ1vNhPFLrtLo3B8RLvmWa/854Znlux+J8odl/Eg91PJHrmwtxjKaz6G86uBCYleu4UqdBfwCq8OgeiJDdiqSyRnPnZa7dvys9wPOAlSyRbe3tPHGSZ98xwGLirOWDKyRQX3pPomWfMaqG1/aMQ/ww4ItFze6BCf66naIm+UdGR+XmTMf4l5fG8kHG2n6DOmNiu8ZMlkqmJ3hOHryif8p5bzxwPgPsUVi7Q33VBoku65udNptD+MYYmPYDxaWB8Yuf2qGZn62XkGyzp2lDRkdHQOZjLYuvMl9Da9qqKHwuMSfNVULoUP5P+RLKTnzeR4vz1XjPNluOc7w1i6skGjDtw3EIud0sqs9cLHUcB86B0FjC+3jeRVqFvy8WVL6pi0YWZbSEeu3OA9Au9OH8FhfZbgFNSzxLJ1kTAb6E79yB43/GtVg3g+DO4e4i5G+OvDOx7H3SmsxR1a/vJGB8BOyaV82dEhf6s2+lb+LeKjmzteB1mh6U8nh1znMGMWR9kyaLB1LMsugIXq9Cz5NhY71cONS/e4v/xo7MHsHS2f0jR7cCq6r/MPYWz4VvkxhCwAXNPQbwWi/7IQFf628rm503FlU4Fdw5mr009LwMq9Ge4yifDmfl7VW379mFo0luA76eeNHXyj3l41Upg/9Sz6lEcp78oyfAPQAlNzOqUtnNKT7FndtZDqMhxnU2sfGQG5l6Dc68DjsFKBw3/ZrifjlXow9axady3KzoyP28ilN6V8nhGFnMuPgp9cWeJfPu1OD6aepZII3Hu8UTPV7aa2ijEm6kXT2D84EuI7AiMmcAreXjVURBNAELu7xdQoQNg17Hiy5sqOtSVzgJ2TXc8lYyDt3DY3H1YuuCx1LNyuSuJy/+O3oqQUEXOw7LKz+PcaizBtnHWnNzJalx+3jgYei0uOhs2nwM0NVJx74h+QAMQVXG73fnYiKUSLcTxGV6Sll1+P/BLL1kiWWhqzuBNDkv/w3ioivO3UOxZTH/XBWDvAxYzvKlUQy9ZrSt07Df0d1e2nWGh4yiwV6Q8oMoNv5O+wFNWL44TvGSJNII4ehyXziTuhtLfsxAYvig7rrOJB1fuT1PuIGI7AtzLccxkeJGY4O9gqNCrmQzn4otqbFbqq2mdfRh9venv3jRu7c0MTloDTE49S6QRNJUfp1xTP0/q3/BiMw9u/ee3z/z6jFktlPY+ktj9H4iO2/q6Wt0s6VqpRi/0tbSsvamiI6dePAHbfFbK46lenDsb+I/Uc5YsGqTQfh1wSepZIr7FpQneMzePX0fzFu+xDWn4Fd8/bf3nq4DjsPcdQan8RhxvA46Funvn4AUavNDt6orf5R6/6Z3g9kx5QNVzvAc6L01tAYZtRVxJzIcI4Btf5Lki/6s+jltfJh7nPXZM8vMmMliqbL5BUznmvt4nUx7RaNnWlef+DlxGvu3NOHc5kM94XGPSyIVuxNEVFR/tamYy3PMdyLTVr2eA9BdmWNa9jEL774CgVlcSycSyq5+i0J71KKo09DvGVbpcbY5t/v+VcVtX4jM2Ausw1uFYB24dZutwtg7HoxjLsdz97DJhOXd98ek0/l+8QLHnZ0CBQ+YeRHP8ZszeDe4Y6uzipZEL/TYGuooVHXnY3FbK8bEpj2f0IjsXPBQ6gNlCnFOhiyRjiAaYrAXkMPba+t/3Ag54tipta226Z98ZdzFsehoKHavA+oC7gbtw7m5Kpb+nduV//4IHgF6gl+nvO4Ry6RycmwO8KJW8hDXwa2tW+brtcXw+tf1J7TSOvMTPu/GbJ3wXR7J7D4s0ro1ZD6C22RSG7wi2A92Y/ZZc7nEK7X+h0PEVCh2nMfXidOY/LLv8foo9n2Bi+SCcnQn8NZWcBDVqoT/CAfvdXNGRM2c3Y+696Q5nzHZn49Nv95K04subMHe9lywRX1x5c9ZDkIpFwFFg7wf7DhM29TG97ejU0u7sHaKv5wb6p8zEudlAZTtyZqBBC92urngv3fVNb936KbG2OV/7pAO56EpvWQJQqxOLwuE03bx+uanE7te0dnybae0z08vpjOnrugIrHwXue+nljF4jFnpMKVf5ZDio1clwz3cCrW0HeEkanh16u5cskbDtnvUAApHD7F1E/Il8+20U2k6FznT6rdg7QH/XaZi9gRq7Dd+Ihf7TrRMfRjat48VgJ6U8nqRExO493tLMqvlQJCIvMCtHY/4MTpfjeHA/pLDqTlrb05vAW+xZzAFTXonxGaAmlvxrwG+mKibDufh86unfkeMcb1njohuBp7zliaTJMngueuhe/jeEaSxHYfyaQtt/kdak5sWdJYrd/4HZOdTAOvL1U1bJeJD+x35a2aGdEZE7L93hJO5wps/xs9b8kq4NwDe8ZImkbWiw7D3TRcmuKhOX/f9/qH0O3H9QaF/EjFnpLR5U7PkGFr0TyHQuRmMVunEVLKrsmz6/+gSMg1IeUfLiyN9VehRf5S1LJDRNbq+RD6rmfM01O/u6BryDwcnfG952NSXFBTfjolPIcBZ8IxV6iVyu8tnZkV2Y4ljSdAYzZ/tZqGLZwj+B/dlLVs0q67FDCFyT/920S24f75kNzd6CK93Mwe8dn1pE34LbME7Maq2ORir0H7Ds8pUVHZmfNxnjX1IZ4OM0AAAXJ0lEQVQeT1om82TuZG9pRmO/whY118RkGBkjK633numcdi7078007/KddG+/d99OHJ1ABq+bNk6hWxXbpEZD5wD+N2tIis/JcXH8TcDPessiadltYgYTmsq6Qs+EvYXBSd/a+pZBOooL/kzs3o7nlQAbpdDvo7jvrRUfbVG93m7/h1OZccHeXpKG11S+0UuWSDrK3jYB2ZaL/Pwdle05jcKkz6WaMND1K4wzAW+TFRuj0I3eircXbe14HdhhKY8obeMYbHmXt7TINDkuXVrFLF3ZrMRn7JdJrvzDJeTb/znVhGL3DzD+I9WMbTTCbmuD0HR15YfHR4Gr/Gp+h2wdzqUz0Wb4ndmhnR7jzN+f7bKe31Novxs4wltmI3FuM+Z/zlYDWZdJqjM/KzvKjjku4+D3/pzl16a3ln+x+/MU2o8H3pRaxlaNUOjfpTh/TcVH9/VcDlye3nACZVyF48tZD0OkasayTHIdB6LPaVk7hJYJFwALUswwmsrvpZS7B9gzxZwGuOVuVvlkOBm9puh6QDtWSR1yP8ok1uzATHLluYwO0t4e+97eRzCbw0h3Vsco9EJfRrHn11kPoiEsXfAY8N2shyFSpTJxyf+KhzNnN4N7kfdc2Z7DybelfjucYs+N4D6aZkTohX4V6KaWN9qwReqNMbD1TQ2/1jUdBKT32pRUx0Xv95IzsfQVHJVtDjYKIRf6ILFdl/UgGsrw3ZD+rIchUjHnlmSTy1GZ5MoO2EkcOqeQesydvUMYX0rr9CEX+g8Z6Fmd9SAajGFWxRsFIlmL78kkNjJ/r5VKJSJy0Sf9JG25lpTWew+30GPX2EuSZiXX9DVqYBtBkYpkMcP9wPa96nhp6ZCdTqHjJamnLLv6KXCpzNsIs9AdDzCw78+zHkZDGl4v/5ashyFSkRz3ec8cz0zqeWnpcDmMk7wkxXwtjdOGWeixXVPxynCSPIdWjpP6UG7u855p7uXeM6Uykc3wkjPQ9T/AQ0mfNsSFZWIsqvw5bqH9FBzHpDie2lF2P2Cg6w+p5+xe/jHrm1aBTUk9qyGY/53AGsO6qhadSopjpt69qVExvpb9NszdiLMPJXnSAAvd3cJAVzWffL6EMT214dSSyI4ATk09587eIQrtXwP+NfWsRhCb4dJd96IxuXsziTV7WSa5MjLnswvKV0P0ARJ8fTHEW+6V3+6d3nY0NEiZD3sz09r29ZLkyg0y2920cUr9ust74vTzdwempXLu0pC3Xb0CNon8vIlekooL7wGX6JKzYRW641EO2PcHFR9v7rwUR1OLmoiiM70k9fUuxfi9l6wsDQ5pudt6ZfHf/GeOezVp/dyNLZVXoRpOU+xvFzzHoiRPF1ah465lcWdlr0zN6NgN4/SUB1R7nJ3tL0zvpEsNsyiDQuf13jOlOmWP29o281cSXM00pEI3ylXcbh+0WcBu6Q2nRhkzyc853EvWuOhGUlpAQWSMjKbNf88gV4Ve68z8PJYEWNK1AViR1OnCKXTHYga6ilV8xfmpjaXWRTk/V+lLujbg+LaXLJHqDAwv8OHR1IsnAK/yminVi7y/nZPY5MxwCt2ofGW46e3TgaPTG0yNM3s3dPr5sy873XaX2uO43XvmhM3HA+O850p1Ytvda54lt/9FKIX+OEObKt+60ziPtPe/rW0vpnXNG7wkDb/3ns3rQSI75r/Q4ZQMMqVaLtrFa17EyuROFQT3dZZfW9ls4+M6mzDOSXlAtc/KF/gL01W61JiyCl12wJnfZXmNR5I6VRiFnosqv92+YvXJwIvSG0y9cO+gdfYkL1Fx/DVgyEtWiCI3mPUQArORF0/xO8M933YccKDXTBkdw8976M/kma7Qn+G4k6WXVzFb1Rp3MtxztWBNfv5dDPSsBvcjL1khim1T1kMIzC0Vv96aFOcu9pon9cNFq5I6Vf0XOlxT8ZHT2vbF6bbXs+xCvM0lMG3YIjXC3eQ1rtBxFPBWr5kyeg6/eyeUS48ndap6L/QtNA9+q+Kjo+gcoDm94dSdAq1zj/eSdMCUn0Fykz9ERulhWtZ8x2uisw/S2JNw60uM3yV0m9iY1Knqu9Cdu5klV1Xx6cYabanXkVm5zUvO4s4SzqWyB7BIxcyuYMkif3MSDp29B8Y7vOVJAszv+gTjJyb2SK2+Cz2OK589nW9/DeBnhbS64v6ZQy70s5BCqXw1CS5zKFK1KPa70FEudybg9zUoGRvfk1Dv+uLTSZ2qjgvdVlDc7xdVHK/JcNvXQnOzn3839y3sB/utlyyRF7qLvt6lnjP1c6fuOL9X6Amq30I39zXojCs69shLdsW5xtuIpVLGRd5WjnORJsdJRtyNXuOmtx8JvNJrZtqcC/+NC+Mxr3kJbtdar4VuxPG1FR+9eeM7wPO7hfXlEFpXvdlL0obSTeB5FqkIGM4qn0CbhNh5XLzJm/DXRHC2xmteedOEpE5Vr4X+++HbtxWyOMS/WAmzOV5iVvZuBOf3B2uaXKT90OuCu52+7vu8xeXnTQTTipT1yLHaa964pgYvdHPXVnzsoXMK4I5JbzCBMHcK+XlTvWS5KiYz1jqLt2Q9BKmAs2u95kWlDwF7es2UZFjZ7y13s8RW7KzHQt9AbnPlz8KiqNE3YqlUE1H5Qi9JfT13YJbFXtR1qn4n6dSIB2lee623tGltR2B82FveP0TjKptTJDtToq/Xb6GXc4ktRV6HhW43Vb6P8awcThuxVMziCzius8lPmDZsqZhDP6jHwrlLvb57HrkuYLy3vH+It+iD39g9iO9XayP2S+5UdSdX+VKvhUknAQekN5bQuKmsXHWql6io/HUaYYKNZMv4PX1d13vLa21/G6BHfPWr6D0xjvdP6lT1VugD9C+o5j1mrQxXPT+T4/p61+K42UtWmg7cP7FFISQN9il8XXHNnN2M8TkvWZKWgQwyE7vorLdCv5ZK/3Lm501GGyJUz3gTh872s81jOYDb7r537ZJq3EWx5+fe0p6K3g9M95YnKXD+3oR4JjK575l6KvSYcrnytcCjodMBvxvVhyEi13S2l6SBfX8OPOQlq5655DZvaChmn8fX1fnBHfth7uNesiQ9Ufxn75nOtSZ1qjoqdHcb9/U+WPHhppXhRs/OxcubAZ0xVPEKYqMyhrIeQh0aYOp+vtZtdzTblWS9eNV9vU9mml/vHA+wZfMfvGYe/IE9sYacFFfFe6SHzD0IODq1oYSvwLSO13pJiqJrQLO4JWFmn/H2OKS1/WLgFC9ZWXNsyHoIqTH3EZZf63ehqJYtr0jydPVS6Ot5uvz9io9utjb07vnYuPi9XnKWXX4/2K+8ZCXPz2tCsfO7P3P9W0zxseu8JE1vOxrjs16yaoF53ivcp1x0t/fMmEQfb9ZHoZt9e3jJ0AocNncfzOamPKLwOfcupl6c2JKEI4TV6+Q4P3cWcgFfFSXN8SuGNp0MizwUT2dE7K6hNubqaFvisVnP0lX3eE1sbT8Ux1lJnrI+Cr2aH/ixXQLsnt5YGsYeTNjyNi9Jm8Z/jyze/5TwxFzt7bZpYfXpQMFL1sg8bXhkoe62dqufD4HPcTqQ6EJe9VDot1Psvr3io80S/cTT2OxcLzErvryJ0tDroO6uRMO9/Vifbqe41s/GP63tJ4Mt9JJVU1yYi0FZBhtGmb0z6VPWfqE7PlnxsdPajgD8vEPdGE5k+vsSW8Vop+6/chUOX7OSk+LnA0gca/GakT1F7M72cpXV2j4b44c05p3AEN+4WE9p44+8Jk5/3yHgXp70aWu80O039HX/tOLDXXRiioNpRBFx7PGOR1Rv26r6KdqmJi1es3NljPcw0JX+Y5vp7zsE46tALvWs6vi5W+QsvA+Xjpu9z26P41lpnLa2C92iL1b5BSr0xNm7vUX1rV6M41FveWOnvdBrgdk8it0/SD1n5uxm4vI1wLjUs6rn6XFV5OlZvVdXeM5zYOenceJaLvR7KHZVcRtkVg6nTRFScBTT24/0E7WojHGln6xE+LlaKce6Qt8h9zGKPd0+gngqdxXweg9Zo+Gn0K3u5rmM5C/0dVezP8jYTes4jpSWCK7dQnd8mWpexWjd+whgt9TG08hiu9hbVrl8BVAfBWb8xktOuRTebc4kOPcJ+rs+7SUr3z4fS/ad4UQ51nnJscBuuTt3mffMiEvSO3VteoTmtZWv2w4Q5xJdcUe25c4iP3ual6jh5X3rYxe2yFU+v2MsJpRDuypKwqX0dXV6SWrt+CyO2l7bwpyfQo+snh6JjeRhmtfc4DUxP+e1YCendfoaLXT33yxZVN3rEZH5Waq0MbXgmj7qLS3ms9TDQhlxbpmXnCXrtUb3s8qYddDf/V8eshytbf+N2b97yBobx/96CnrYT44H5v6z6p4Zi6kXT8BFV5HiKqa1WOgDbBq3oOqvMo5IYSzyDDsVOv18vwx03wn82EvW6D1Ocf4aP1GLyvh6Xl/bNmHuDD/PzGflKHRciTl/j5vGIi7f6CkplEJfTHHfa7wmTtj8GeAlaUbUWqEb5jpY8eXRrEZ0aOKjkW3ty7RVL/OWlrN5wGpvedVy/M1zYoizi6uxkig+lmLXTakn5edNpDDpe2nNRE6BUdriZx/vvinLgTq/Y2QriO304d0ePZnW8Qbg/6YdU2OF7nopdv286i878pJdgcnJj0eeIzJ/8xSW9izHotne8qplngvdsdJrXi1x/AFnr2LZwj+lnpVvOxtXuht4a+pZyVnh7z3qzhjD7xajSXPRmQz0+LtYaJ09iciuxcOGYbVU6BuJqfK98602r/e0iUiji/xdoQNMnfxjcEu9ZlbK2R89J/q9PVgbYrBPs/+U19PXk/6t3sLcY3FuIfDi1LOSdZfXtMiqm7BcSxy30Nf1O3+BnRHkrsfTCqa1UuhlsHNGvdJTX+9atMiHB/Yir3GLO0u4+Fxqb830LcTNP/GauHu5F6PPa2a2/kLsjqG/52Pp72veGZFv/zeIbwXq7+LA2de95vXtdyPG771mJqMIdqHXxPyjl2Kc5CuuFgrdwF1If893xngav1vfNaa9vSf29dwBdHrP3bmfUZzv95n2nb1DEJ0JbPGa69+DmF1A/5RXMNCV/q3dQ+YeRGHVbTg+BzSnnpc4t4rBzd/3m9kZQ9PbgX6/uWOymNLQ67zc6fmH1o5zcO4/veWRfaEbZnPp77o2gTOlv/SjZDPTur/708B3M8neLnddJrHFBX8Gdxa1d8ciCZuAD2NNrRR7rvYyYanQdipN8V3AcalnpcY+6H0dcoDi/DVY0/HAcu/Z1THgCxww5UTuv3KVt9TWtrdjdjUenptvK8tCH8Ls3MReQbHoG4S5E1DtMJZklvx0+Wzg1xnlb+su+ru+l1l6f9d3wb2L4QIMxa248svp7/4Cxfnp34E4rrOJfPvHwX0PmJh6XlqM79Pf/c3M8ovzV2DlE3A8kNkYdu4hjLfR3/3h9B/bbKMw50TM3UAGG/hkVegbMHsrxZ7rEzvj8PP3ryR2PnmhCM+39raxsncj0Za3ku2VuhG7fyPrRW/6u75LxGuAuzMdx9gsx9yXsHgG/d0n0tfrY/Kjo9BxGitWLcHxCaDJQ2Y6jJ9C0xlZD4Ni7wCD7jXg/ifroWxjEOOztLjDvWzas61C26kQ3Qy0eM3dylFo9/3D6Q5iu4CBnuR/GM2Y1cKWSd/G8bbEz93ojF9S7H5j1sMAoLXtDMz9PzzNHAW2/gC1z1PsWewtcyTHdTbx8KMXgHs/cHjWwxnBRnC/x+w2iH4x/PjAo2kdbyCyzwCv8ZqbBuNrjFt7kddVzkY0K0d+8vtx9kmy21OjDPY94ugjXrbSfb7W9nO3bi6V2QdFj4Xu/gdXbqdvYdrv7zpa2y/C+BLarCUhtgJrfi3F+SuyHskzpl48gQmbP8TwhLk0b20N4eyD9PVcnmLG2OXbXgbuPThmUyvf945HMa7HRT9j8OnfZ/Ksd1pHnpzN9znTOEUxuI/Q3/X5rAeyQy+Z/SJK0VfBvdNj6mLMrseiXzDQ9ZDH3GcV2v8V+H94fmb+fD4KfTnmvkBx3x6vK/PkZ08jyn0W4x1kP/mvfjl+BXa219mh1SjMOREXfRZjZsJnfgS4GYvnU1xYP29QHNyxH012Lo5TcczA2Mtj+hbM+nAsw0U/p3nNdZldRc6Y1cKWfT6Icx+nHl9Fe64tOP5A7D43qoW3slDoOA2sneEJh2lcsa4DuxMX/Y5S6cvc15vN6nUzLtibwZYrgNMyyX+eNAr9EYw/Ardj3Lp1Xe7s5OdNhqE34aLjwWYyfGuyDl9P8cjxBNhvwHrpW+j3fevRap19GJZ7J/BG4NVU9kN8HcZqItZithJYhrmlEN1DcfJfvX4ATcvBHfsxLp5GOTcJbBKRTQEmYowDdsEYT7TNvytjiB3vrb0esw246GmcrQdbj2M1JVZTjtayfM2arevOZ2fGBXuzpeUiHO8H9s90LNXZAqwFWwXufuA+4D5idxcud6eXyYJpOPgDe9IyeATYYRgHAXtg7EHEBMztCbbtFW0Zt3WJY2MDxkacrYNoHc7WYfYozh4iblnpbx+FnWhtPxmjphYiGkuhrwZbCtG9YEuIbAmDpSVeXw0Yjfy8cVjpCHIuDzYNc9NwdgjGVIb/YMZnPcSUPMnwD+oNwBPAY8BajMfA1uDcKoz7MLvX67KIqeiMmL52P8q2H47dcHELuM2UbRM5nmDQbeTgfdd6nfkq6cnPmwil43B2BrjTgHFZD+l5eoc/MLoncTw5/J+2njJP0JR7nKZ4DUu6tEVuvcjPOZwo+lItPsYZZaG78xJ5d7wW5du/hOODWQ9jzIyLaS5/m6FxT3tfBEXEh/y8yUTlyzF7O7V8161cPoj7eh/MehgyRjNmtTC4z6fAfZAafUNilIOyGppdmbDIDWK1vxX3iByrubf3kayHIZIwR2Huq8DOgtK5GHtkPSBpANPbjmaQr4J7edZD2Zma/JQhIvKM6efvTtzyJojegrO3YPF+WQ9JGsChs/cglzsNOI+YY7IeTiVU6CJSW4Z/kL4O514HdiwxrwBawLJe0kdCd8iFU2hqORn4Z7CTqbM5VSp0EclOft5UXOlY4CU4phPbYTh3OJAL4tGX1LaXzH4RQ9HJRMwkjl6Fs5eD1e1rzip0EfGrdfYkyB2F2XFQagP2AYavvl2m63JIY3C0zp5OnDuJEh/Bse/w9179f4BUoYtIZY68ZFfWPT28RvXug46hlj2f+b04Ho9FE4iiJsz2ANuDiL2GJ63ZHjj2wpgO7qUY+w5/kcpbxujA9uGFk8bbLuDGUYpzuGjrhjtuIo59cDYJ3D6Y7Y1zLwV7FcYeIX77jfY99Bsw/pr4aGqB4yTqejvFrRxXAXdUdrDtTuzS/3AXsQte3hG2FsztmuwpiYhGMaPamEj1S9OOx1W5upkRwahmfE/E7WB8Ro563o2sVph9hMg9XuGxbnjBlSpFL1ikpYKsKr433U7+7hoT2PGz5h1/L/9jcaPt/2YLbgd/h43x1P/qf6nIYnMWERERSVjdPvwXERGRZ6nQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJgApdREQkACp0ERGRAKjQRUREAqBCFxERCYAKXUREJAAqdBERkQCo0EVERAKgQhcREQmACl1ERCQAKnQREZEAqNBFREQCoEIXEREJwP8HGbCJ7Xfk4rQAAAAASUVORK5CYII=" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
'article_id' => '2847',
'hit' => '937'
)
),
'Slider' => array()
)
$current_user = null
$logged_in = false
$image = 'https://www.old.newbusinessage.com/app/webroot/img/news/'
$user = null
include - APP/View/Articles/view.ctp, line 115
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
Notice (8): Trying to access array offset on value of type null [APP/View/Articles/view.ctp, line 115]
$user = $this->Session->read('Auth.User');
//find the group of logged user
$groupId = $user['Group']['id'];
$viewFile = '/var/www/html/newbusinessage.com/app/View/Articles/view.ctp'
$dataForView = array(
'article' => array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
[maximum depth reached]
)
),
'Slider' => array()
),
'current_user' => null,
'logged_in' => false
)
$article = array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
'article_id' => '2847',
'hit' => '937'
)
),
'Slider' => array()
)
$current_user = null
$logged_in = false
$image = 'https://www.old.newbusinessage.com/app/webroot/img/news/'
$user = null
include - APP/View/Articles/view.ctp, line 115
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
Notice (8): Trying to access array offset on value of type null [APP/View/Articles/view.ctp, line 116]
//find the group of logged user
$groupId = $user['Group']['id'];
$user_id=$user["id"];
$viewFile = '/var/www/html/newbusinessage.com/app/View/Articles/view.ctp'
$dataForView = array(
'article' => array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
[maximum depth reached]
)
),
'Slider' => array()
),
'current_user' => null,
'logged_in' => false
)
$article = array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
'article_id' => '2847',
'hit' => '937'
)
),
'Slider' => array()
)
$current_user = null
$logged_in = false
$image = 'https://www.old.newbusinessage.com/app/webroot/img/news/'
$user = null
$groupId = null
include - APP/View/Articles/view.ctp, line 116
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB
16 min 14 sec to read
September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.
The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.
The bank, in its Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.
Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.
The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.
FormHelper::create() - CORE/Cake/View/Helper/FormHelper.php, line 383
include - APP/View/Articles/view.ctp, line 273
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
$viewFile = '/var/www/html/newbusinessage.com/app/View/Elements/side_bar.ctp'
$dataForView = array(
'article' => array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
[maximum depth reached]
)
),
'Slider' => array()
),
'current_user' => null,
'logged_in' => false
)
$article = array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
'article_id' => '2847',
'hit' => '937'
)
),
'Slider' => array()
)
$current_user = null
$logged_in = false
include - APP/View/Elements/side_bar.ctp, line 60
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::_renderElement() - CORE/Cake/View/View.php, line 1224
View::element() - CORE/Cake/View/View.php, line 418
include - APP/View/Articles/view.ctp, line 391
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
Warning (2): simplexml_load_file() [<a href='http://php.net/function.simplexml-load-file'>function.simplexml-load-file</a>]: I/O warning : failed to load external entity "" [APP/View/Elements/side_bar.ctp, line 60]
$viewFile = '/var/www/html/newbusinessage.com/app/View/Elements/side_bar.ctp'
$dataForView = array(
'article' => array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
[maximum depth reached]
)
),
'Slider' => array()
),
'current_user' => null,
'logged_in' => false
)
$article = array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
'article_id' => '2847',
'hit' => '937'
)
),
'Slider' => array()
)
$current_user = null
$logged_in = false
simplexml_load_file - [internal], line ??
include - APP/View/Elements/side_bar.ctp, line 60
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::_renderElement() - CORE/Cake/View/View.php, line 1224
View::element() - CORE/Cake/View/View.php, line 418
include - APP/View/Articles/view.ctp, line 391
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
file not found!
Notice (8): Undefined variable: file [APP/View/Elements/side_bar.ctp, line 133]
$viewFile = '/var/www/html/newbusinessage.com/app/View/Elements/side_bar.ctp'
$dataForView = array(
'article' => array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
[maximum depth reached]
)
),
'Slider' => array()
),
'current_user' => null,
'logged_in' => false
)
$article = array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
'article_id' => '2847',
'hit' => '937'
)
),
'Slider' => array()
)
$current_user = null
$logged_in = false
$xml = false
include - APP/View/Elements/side_bar.ctp, line 133
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::_renderElement() - CORE/Cake/View/View.php, line 1224
View::element() - CORE/Cake/View/View.php, line 418
include - APP/View/Articles/view.ctp, line 391
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
Warning (2): simplexml_load_file() [<a href='http://php.net/function.simplexml-load-file'>function.simplexml-load-file</a>]: I/O warning : failed to load external entity "" [APP/View/Elements/side_bar.ctp, line 133]
$viewFile = '/var/www/html/newbusinessage.com/app/View/Elements/side_bar.ctp'
$dataForView = array(
'article' => array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
[maximum depth reached]
)
),
'Slider' => array()
),
'current_user' => null,
'logged_in' => false
)
$article = array(
'Article' => array(
'id' => '2847',
'article_category_id' => '1',
'title' => 'Nepal’s GDP growth will hover around 4.5 to 5.5%, says ADB',
'sub_title' => '',
'summary' => 'The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.',
'content' => '<p>September 3: Nepal’s GDP growth rate in the new fiscal year (2015/16) will largely depend on the scope and pace of post-earthquake reconstruction work, and it is likely to hover around 4.5 to 5.5 percent, the Asian Development Bank has said.</p>
<p>The bank has identified adverse political situation and slow capital budget execution as the two downside risks that could lower growth forecast.</p>
<blockquote>
<p>The bank, in it<img alt="" src="data:image/png;base64,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" style="border-style:solid; border-width:0px; float:left; height:208px; margin:5px; width:257px" />s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.</p>
</blockquote>
<p>Nepal’s GDP will grow by 4.5 percent if there is marginally better rainfall, modest pickup in actual implementation of reconstruction projects through the National Reconstruction Authority, gradual normalisation of political scenario, continuation of previous trend in spending capital budget, modes recovery of tourism related activities and slightly better service sector growth, says the bank.</p>
<p>The ADB has forecasted a growth of around 5.5 percent if there is slightly better rainfall and adequate paddy plantation in the main paddy plantation belts, robust pickup in manufacturing and construction activities propelled by accelerated spending by the NRA and improved capital budget execution by the ministries, normalisation of political scenario, and robust services sector performance.</p>
',
'published' => true,
'created' => '2015-09-03',
'modified' => '2015-09-03',
'keywords' => '',
'description' => '',
'sortorder' => '2687',
'image' => null,
'article_date' => '2015-09-03 00:00:00',
'homepage' => false,
'breaking_news' => false,
'main_news' => true,
'in_scroller' => false,
'user_id' => '14'
),
'ArticleCategory' => array(
'id' => '1',
'name' => 'NEWS',
'parentOf' => '0',
'published' => true,
'registered' => '2015-07-20 00:00:00',
'sortorder' => '158',
'del_flag' => '0',
'homepage' => true,
'display_in_menu' => true,
'user_id' => '1',
'created' => '0000-00-00 00:00:00',
'modified' => '2018-11-22 11:58:49'
),
'User' => array(
'password' => '*****',
'id' => '14',
'user_detail_id' => '0',
'group_id' => '1',
'username' => 'ajoshi@newbusinessage.com',
'name' => '',
'email' => '',
'address' => '',
'gender' => '',
'access' => '1',
'phone' => '',
'access_type' => '0',
'activated' => false,
'sortorder' => '0',
'published' => '0',
'created' => '2015-08-27 15:54:45',
'last_login' => '2015-10-07 16:37:23',
'ip' => '202.63.242.112'
),
'ArticleComment' => array(),
'ArticleFeature' => array(),
'ArticleHasAuthor' => array(),
'ArticleHasTag' => array(),
'ArticleView' => array(
(int) 0 => array(
'article_id' => '2847',
'hit' => '937'
)
),
'Slider' => array()
)
$current_user = null
$logged_in = false
$xml = false
simplexml_load_file - [internal], line ??
include - APP/View/Elements/side_bar.ctp, line 133
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::_renderElement() - CORE/Cake/View/View.php, line 1224
View::element() - CORE/Cake/View/View.php, line 418
include - APP/View/Articles/view.ctp, line 391
View::_evaluate() - CORE/Cake/View/View.php, line 971
View::_render() - CORE/Cake/View/View.php, line 933
View::render() - CORE/Cake/View/View.php, line 473
Controller::render() - CORE/Cake/Controller/Controller.php, line 968
Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 200
Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167
[main] - APP/webroot/index.php, line 117
s Macroeconomic Update, has envisages two scenarios for Nepal’s economy, and forecasted growth of 4.5 percent and 5.5 percent for each scenario. The government in its budget for 2015/16 had forecasted the growth to be around 6 percent.
