Physics
Grade-8
Easy
Question
A person is moving forward while swimming by applying backward force on the water. What is the action force?
- Backward force on the water.
- Forward force on water.
- Person moving forward.
- Person moving backward.
Hint:
Person moving forward
The correct answer is: Person moving forward.
- The action force here will be person moving forward.
- The third law states that for every action force in nature there is an equal and opposite reaction force.
Related Questions to study
Physics
Observe the image. Which law diagrammatically say this?
![](data:image/png;base64,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)
Observe the image. Which law diagrammatically say this?
![](data:image/png;base64,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)
PhysicsGrade-8
Physics
An inflated balloon’s mouth is tied with a thread. The thread is let loose. Newtons third law applies on it. Is the statement true or false?
An inflated balloon’s mouth is tied with a thread. The thread is let loose. Newtons third law applies on it. Is the statement true or false?
PhysicsGrade-8
Physics
A man pushes the wheel of his wheelchair with his hands. Newtons third law applies on it. Is the statement true or false?
A man pushes the wheel of his wheelchair with his hands. Newtons third law applies on it. Is the statement true or false?
PhysicsGrade-8
Physics
A girl is swinging on a to and fro swing. Newtons third law does not apply on it. Is the statement true or false?
- Newton's third law states that for every action force in nature there is an equal and opposite reaction force.
A girl is swinging on a to and fro swing. Newtons third law does not apply on it. Is the statement true or false?
PhysicsGrade-8
- Newton's third law states that for every action force in nature there is an equal and opposite reaction force.
Physics
Moon orbiting the Earth. Newtons third law act on it. Is the statement true or false?
Moon orbiting the Earth. Newtons third law act on it. Is the statement true or false?
PhysicsGrade-8
Physics
A person stops a ball. Newtons third law applies in stopping it. Is the statement true or false?
- A fast moving ball has a tendency to keep moving due to inertia.
- According to Newton's second law, the force with which ball is moving is equal to its mass multiplied by its acceleration.
- When we catch a ball, momentum of the ball is transferred from ball to hand.
A person stops a ball. Newtons third law applies in stopping it. Is the statement true or false?
PhysicsGrade-8
- A fast moving ball has a tendency to keep moving due to inertia.
- According to Newton's second law, the force with which ball is moving is equal to its mass multiplied by its acceleration.
- When we catch a ball, momentum of the ball is transferred from ball to hand.
Physics
A man holds a book in his hands. Newtons third law applies on it. Is the statement true or false?
A man holds a book in his hands. Newtons third law applies on it. Is the statement true or false?
PhysicsGrade-8
Physics
A batsman hits a ball with a force of 15 N. What force does the bat experience?
A batsman hits a ball with a force of 15 N. What force does the bat experience?
PhysicsGrade-8
Physics
Newton’s third law states that
Newton’s third law states that
PhysicsGrade-8
Physics
In a rocket propulsion the rocket launches when hot gases are released. What is the reaction force?
In a rocket propulsion the rocket launches when hot gases are released. What is the reaction force?
PhysicsGrade-8
Physics
A gun is fired on a man which is the action force. What is the reaction force?
A gun is fired on a man which is the action force. What is the reaction force?
PhysicsGrade-8
Physics
A man hits another man with his hands on his jaw. This is the action force. What is the reaction force?
A man hits another man with his hands on his jaw. This is the action force. What is the reaction force?
PhysicsGrade-8
Physics
Action is being applied on a wall by hands. What is the reaction?
Action is being applied on a wall by hands. What is the reaction?
PhysicsGrade-8
Physics
Which law is being expressed in this image?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJ8AAACfCAYAAADnGwvgAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAEXBSURBVHhe7Z0HfJXV+ceBLLJDwt4jIBtRRPYOy1G31rrqbEErbmtr1VprnR2uv3sWteLEVRwgigxBFBVH3aKysudNbvL7P99z88Ll9hKSEJJQ78Pn4d6847xn/M6zzvOe20IRilATUQR8EWoyioAvQk1GEfBFqMkoAr4INRlFwBehJqMI+CLUZBQBX4SajCLgi1CTUQR8EWoyioAvQk1GzRp8VVVVys/PV3FxcfWRCP0vUbMG3+rVq/W3v/1N9957rzZv3lx9NEL/K9Rswffxxx/r5JNPVmJiojp37qx//OMfys3NrT4bof8FapbgA2Rz5sxRfHy8WrRo4bhnz56aP3++Kioqqq+K0N5OzQ58ZWVluvTSS5WUlKRu3brpkksu0emnn+4AOHToUC1cuLD6ygjt7dSswFdeXu6kW+vWrdWmTRtdfvnl2rRpk959910dcsghDoDjxo3TG2+8UX1HhPZmajbgq6ys1PLlyzVixAjFxMTojDPOcKADfN9++61effVVTZw40QGQz6+++qr6zgjtrdRswAeYzjrrLEVHRztwvfTSS87D/c9//uPOffPNN7rvvvs0YMAARUVFad68eSooKKi+O0J7IzUb8N1+++1KTk52Uu+ee+7RDz/84ED3ySef6LPPPtPXX3/t+Pe//71Tyz169NBjjz2m0tLS6hIitLdRswDfv//9b+2zzz6KjY3VOeeco/Xr1+vHH390wPv0008dA8Dvv/9eH374oX7+85879bv//vu7WGCE9k5qcvBh051wwgkOTNOnT3dg2rBhgwObB7xgABKGefHFFzVq1Ch3z5FHHqkvvviiurQI7U3U5OBD3RJEhlnJQLV66jYc+AAa9t8///lPde3a1QHwj3/8owoLC6tLjNDeQk0KPkB24IEHOnX7i1/8Qp9//rk7Fk7qeQwokYx8XnHFFUpJSdHgwYMj8b+9kJoMfHl5ebryyiuVkJDgYnfPP/+8s+kAYDjQBTMeMDbhmjVrNHnyZLVq1Uonnniivvvuu+rSI7Q3UJOBb+XKlerfv79Tm4AQMKFSw4EtlJF6SEjA9q9//cuVgwS88MILq0uP0N5ATQI+4nfnn3++WrZs6WJ6r7/+urZs2VKjug1lAPjll1+6kMxll13mEhAIvxCoJmAdoeZPTQI+Qius2yKtcDiw4ZB6dQEfjPpF+iFFZ8+e7aTo8ccf7zzoCDV/anTwZWdnO6mHnTZr1iy99dZbDizhvNvaMDYi4Zdbb71V6enpLlD90EMPyefzVT8xQs2VGh18zz33nEuPat++vQutoDrhcMCqDSP9kJwEn8877zynyvfbb79I8HkvoEYFH0thOAWox2nTpjlvFUcjHKhqy4APdY0dSfB53333dUt0N998s0pKSqqfHKHmSI0KPlQsUqlt27b661//6uw8bLZwoKotAzxUNpkvqOC//OUvDnwDBw50mTARar7UaODz+/0uSZSMFOJ6pEuxUgFg6upohGPKQIrifHipV6wT8wJShJonNRr4WDYbP368S43H4UBSccwDTiiY6sLcD1Me9iO2ZIcOHVz61YIFC6prEKHmRo0CPjKUAUSXLl3cctrLL7/sgFKb1Yy6MABEjfPyETYlUvaoo46KvHrZTKlRwEd4BalHeOWXv/ylA8jueLg7Y2/lA+/3tttuc7HEfv36ObBHAs/NjxoFfO+8846TeqhCQMFqRkNLPRjweeqX74ceeqjLjD766KMjSafNkPY4+Eh1v/HGG10AmJeAli1b5iTf7tp5NTHA3rp1q/OoiScCfByRyGuXzYv2OPg++ugj593ifZICBfCIzYUDTUMxwMahwaM+9thjFRcXp1NOOSWy7NbMaI+DjxUN3rlgHfeRRx5xS2HhANPQDACRfux0wPPxsokzRqj50B4FH9nF1113ncs4Ofzww53K3bhxo5N8e1r6wUi6JUuWaMaMGQ6A1157rcsjjFDzoD0KPkIeRxxxhNLS0nTDDTc4W8zLVN6TNp/HeNQ8j6U2klZZXSHlKkLNg/Yo+J555hln8LP7AN9Zf60r6Lgez9Vj71htyuF6nvnKK6+4hFOSDkjhilDzoD0GPvbWu/76652jwS4ESBxsMA9Au2LWfYnXoaZhUuwJoXjqurbg475169bpN7/5jbP7SLcnATVCTU97DHzE8s4880y34c8FF1ygDz74wHm6uwIfqtJ7YZx7Vq1apRUrVui9995z5ykDUNY2Tui97fbss8+6t9169+4dWXJrJrTHwIekI8TCKgPJnUismt7RQJJxHvAhqZ5++mn94Q9/cC+I824uSQIkjLJJENcCTgC4KwkI2AEz+X68ZM4qC2vLkRWPpqc9Br7777/fORqkNr399ts1BpYBiJdowAtBWVlZyszMVLt27ZyjgKdKWUguyiNmh+eMBASE4cr02Cub63i/NyMjw5XPuQg1Le0x8CFdsPemTJnivF6kTygwYMABiNgigy1wR44c6e6ribHdfvazn7nt1AAswOYZ4cqHkaiAjxeVhg8fro4dOzppjF0aoaajPQI+skhQlUgsUtsZ/HD2HpIQ1QmA/u///s8lAYQD284YtY6k5P6aJKCnplH9ZLlwLwkObEQZoaajPQI+pBAJnbzK+OCDD7qBh0PBByiRiOw25S3BeRyflKjMIYM12lRk1pFHaez06eo/dKhiYmN3uA4VStYKHnFw2aHM80k2/dOf/uRUOfYf6jhCTUcNDj5UGe9SsOsUA0wqOwMfzjv1QEn4gxjcNuCxInLSiXr41Ve0ausWrTcJ9ZHxE28s0czDfrbDXs3ch4oH8JQV+gyPeT7qnZ0RDjjgAOf1Uk8yrCPUNNTg4GMw//73vys1NVVTp051IRI82FBnAzBwnBAICaYemOJMVZ8yZ46WmHe61craaGVuMM4x3mIe6tIP1+nn5nB418NDhgzRAw884CRbOJDDPJ/nYVuyLwxLfuz1F0mzbzpqcPDxvix2FRKJpTVsvVCJhPrFTgMMZLp06tTJgail8XCTli8uXy7eOwMWPxpvMGlKPgp/sxfpg6+8oqFjx6pVVJS7jxeG5s6d69QoqnxnXjXHCXRfdNFF7j6cD+oXoaahBgcfkgS1xuCee+65bnEfkAWDwAt/AIbDDjvMJXxyfZu0NF3629/qKyujyMrKVpWBMMBIvu/sc719vlRQoDk33qjYIPV78MEHu6RVgL6zpAWeR1bN3Xff7TxecgzJ84tQ01CDg4/VBJbTULuoX5a3kEahQEDikOsXrHJ79eqlx55coE0mPck9KTCwlRnnVlXqK1O5qyqr9LwdX2T819deU1pGxrZ7SdNn/Rjw1aR6qc/ixYvdbgnEEXGIeMckQo1PDQo+nA2WwwgEY4cRBkHChQMDx1k+83YYhXv366f5ixbpC3+FvrfyvjewfW5lrjTb77WKCj1rf7MwttT4/nfXqkdm5rZ7yVgBSEjZcGD3GHCygoJUJnCNCsZWjFDjU4OCDwmCA4EEw9kgqIttF04NhgNf9z59dPPC5/SCr1iLrbxlvgDonqn06SmTfk/ZsSeNAd+D6z5Q5r77bruXnQp2tf0G9fC8XtKsiENST+oRocanBgUfweU77rjDpVERZMYGAwihks9b1eAzGHwdO3fWb2+/XY8V5us5Kw9J93RlhRYAPlO/T9sxwEc+8n1r1qqtXe/dSzmPP/54jZLPc0RycnLcCgf3kfhAylWEGp8aFHwMKr8axICeeuqpLvYGEEIln+dwcO6kk05yYQ+AgCQaZZLocQMmku8JYwc6k3oe8F4yfsNXrqsfe1ytExK2gY/NxLHlKHNnNh/Ms/F4F5l6HzRokLsXdR2hxqcGBR+eLb8chPeKTYV0AwiexAkGgCehSO4MXlaLionWxXfeqcVlZQ6AzxoDPCQh8ukd47vfeFNjZ89WdEzMtvsIVANyygx9XjDzbJwONiligrClGun1Eaej8alBwYenyx7JgIEALjl9ACKczefZX2SnILU8ELVo2UKZw/fVZffcqyfNXnzGV6rn/WV6zjzgp37cqHsWv6GDjjtu+/XGhE1ISgD8NUk9j6kndh5SmnDL2Wef7ZbnItS41KDgQ83ykwYAgnc2UG87Ax+MlGLQ+WVJdqTfBqiWLdU2I0OHnnyyrnviCd3x8r913YIndfJFlypz4OBtcUGY7+T67WwlJRx70pFkBuxTXi6POB2NTw0KPhI2GUxsvrvuusuBryYwAEpsPwK93g/BBHO82XSde/RQj9593GdyatoO51lFOeigg5z9Vpd9/rznPvnkk26yEKbhLbcINS41KPjYDZSlMpI++ZGW2m7yjfRj8Hm9MhhcNTGbAAFYkgOI3e0svBKOqRNgJemB+vJOccTpaHxqUPCR4s5g8qMspMFjg9UGfAAHJ+C1117Taaed5hJK8XxDAccaLs4J0u7iiy/W0qVL3X3EEmtKJg1lnA7AR6o/AXHK5v3iCDUuNSj4+JlSjP+xY8fWKsfOY8CAKsQ7xh4jv4+fP8V5GTNmjCtvwoQJzjtlyY6dBwAPS3S1AXcoe+DDTpw5c6YDH78FEqHGpQYFH6sb7ERFgierG3Wxw2AAiBTEG/WkGfutvP/++y4VinNeNgxebbgwTm3YC7dgoxJnxHZkmS2SVt+41KDg45VEwMdvYqCC6wo+GDB5AESy4Rh4zLGaslZqy4CPsgE3r3Wi4ufMmRPZRq2RqcHAh9RAXQI+Xu7BHkONhhv8XTHggPkOGD3pFnx8dxkgU9Y111zjdlTgjThWaCLUeNRg4GPvO7KJCbWwGSN2GdIl3MA3B0aC8nnLLbc4O/WYY45xkyVCjUcNBj7eBCO2R44cL3p77+qGDnpzYU9933ffferevbvzoDkeocajBgUfGcJ7C/g8p4U9A0kBYwNxHJsINR41GPh4d8MD33HHHbfXgI9guJd/SOglQo1Hew34PMcDVbm73i5MPJFyyAFkaw7eM478XlvjUoOBz/utDRyO3VW7oeEWQjbss8fLP/ysAsFrz2GoD3vlA0DCQ3379nVBbF4BiFDjUYOBj/d1yQ4m1ILn6O06H27wa2KAgdcJuHjXgu3RWIPlfRBS39nsB8cGFYnk4vpw5dTEEfA1D2ow8EG8PUbYgp88IMhc1zift2qB1CTJlAAwyQOsmLADgrfGy3fCOgCovhLQU7uAOqJ2m4YaDHzsdwcg+EVJwEKSQF1WOAj4Alak0rx585z6Jr2eADDbmpH0yd56gI/vLIcBnvoGsj2Hw/N2SWjlVc4INR41GPiQVqgukjsBHz9lX9vEAo/JgkHVkl8HyEgqICOaH3MhGOxloPBO8K9+9St3D6q9rqseANx7q86L8wG+SEJp41KDgA9bycsOgVFh/P5GbVOqYICAg7Fw4UK3mym/GsRv55JYwPsWJC0MHTrUlU+y6umnn+7uq6/kA3zUjWxmNg3CViWtPpJc0Hi02+AjC5lEAjJDkEgkebIHCrYUHiqgCjf4wQwIAB6ZK+TVEa7htzMAHMeQqpdddpmzJ8OBr66Sj+t5Hs/l3Q/AR7mUT7gosmVu49BugY+UJJalGDj2Z8E5ICsYyUVmMGGR2oAPRkryni/v+5I0ymbiJCcg+cgTnDRpkgM4z+LnrHhbzbMT6wM+smT4jvdMKr33Xgh1R/pGALjnqd7gQ2qwyQ8DhvfJr0kSasHhYPNFvFWyRGoDPsBAyj0gY0NJwMfuVSx3odK9+CEOCOAGhKTckxK1s+12a2Keh62IVOUVT8rEnhw9erST3HwibWsCIKElAus7U9MkWrDkSJrWT52JAYfry3qBD+CxisEbZ0iKq6++2g3kE0884TxRAMkOoEg+rg0HgGAGoICB+B3v0QIEAIf3yYvgpMyzrwo7UZHdjJTijTOeWV/JRzIpzg0xSe93gHE+MBloF9u81bTcxnO9jS9DN5jkbyTr2rVrnTQnhPNTZK/t9Hm4fRDrDD4K4j0LBggb6aqrrnJSggF96qmnHBgBHzYa3i7hjF0BEOMfFc4rlEghVkheeOEFJ9nIESSNnoRPnsVL6YCFtVjAWV/wEQbCkUHKUV/29+McafqEXlDtpPJzLBxhElBPbERWXoIJiYgtjMdPyAmQ/pSZBQcmeyjVCXwAiYxfgMeLQr/73e8c8DyUYysBFAaTrWqRZl4wN3jwgxlgAlIGCrsOpwU7jHKRTPyKEYDs2bOnA+KFF17oyiccg1quj9r1ngmAPGfD27icFRVAzjORwkwiXgENJn7QECnNygjqHzAHE+qWsnmzjrxGgEi5PzUGdGguFhxw8EKp1uAjKIt9BPCw61CFdCw2GbObDsZmY8tZbDa8UQaF+2qSfJxDPT/88MPOy2XQUbkAC0ADcOwwYog8h3AIYEE144wgwXYlWUOZyYDEJBzEJMJ7JqyDmqXT3nzzTf361792tivS/aabbnKbIHlEW1HT7PWCmmaJrqSEvVQDBPjoG/qDNiDBf2qMSYTZwSSEMUNCqVbgQ4KxKwAbcWPTsQLBe7ZIJ5DNy0IMGiLWM+DZEpdjXjA3HAg8RrLgrLCSgeQDiAR8kag4HgAeiYp0JO0d8DHwqM36gA8Jh63GMwEXewnec889DijMUoBD+5hIABBvmAmBE4HhzG/4siUbKpvNLdEGdLZHHviQfLSB9ocydYbDndvb2TO10FwAjz6tF/iQEKhQDH5ABfDoWEQqA+SBDyDyEFQmEozkTMCIuGWww4HAY+KB2IsDBgxwzyHwi1RDEgE2JB8AQa2zDQd/I/kAC7ZEuDJrYiYEUhmVjhRndYPdC5gsnppAumF34pDg4GDLsjMCzyQMRMCbYDqrMHx/9NFHtzke4cDnPdsbHG9dmv7hkz6q6ySqD3ugD/6b/vCeDwfXtz7slY/2qjf4sKeweZBI2D9IPwaHgfGA5zGqigcRYmG5CpuMAQW8dHZoBT2moYAPFcVvcQC+G2+80QEBJ4SgMw4G9hXqjaAwIReASj0oP1y5O2NAB2BRCTgZTCheHmKPPtrgtYcOA2h48CRKIG2JZSINCaojifG8+WSHBjYbotMhQguh4PMGljoANurgMQPTWOBjLDxw0Rc8s6HB75VTb/ABPF6kBnjeq4VIOAYkGHTBg4U0ZGWDXQWIyxH7o5yawEdFuYayCaUAPp4LEOgc7C0GHtuMn7tC5QEYfj+X5wG+unQaZRLQZvIguZCiJCmwe0HwhKI+1AHVjnrmWuqBWYC3j3mB2mVvZ5wVJgyTAQoHPp7NACPpMB9waigH4PMDhzwvnJagvnyGayPnPA49550P/psyKN8DGv3OpEO6s36OmkQie/furOzgY+HOe3WtF/iYjRjg2DqAgfAGKpSODAZcKCOt6FhUItIKFY1NFtqhoQyAGDhWLchiAQw4F5xDkgJ+bC+yZvibOhHYplF1BR9M8BupjMpFpaLK6ajQ9gAIAE67sAm9hAfWsXFIAB/gweli0KgLtDO1yzX0B8BDVfO7dMQrCdYff/zxLsOGQeJ6GFsbrYBn7q1FM9jB52BARB97YOE6gMx93r08F02CDY00Z4wLCgrcuLKq9Oc//9mZOtQRYUGZXvnUyetjnu1Ja+rARKbd3OMBcbfA5/1cKQBCzTAIgIPP0AEKZq7hYXimDBKNooLebNoZU3kqihoEfHyy3QaN4dcrveUvbEFAQBIAapiO8wYrXLnhmGsZEECM1COmh2TDwQnXJtpMfwBApBvPxQTB4SA0hLplcINpZ+ADIICA+CEqnCVIziPRUd2odwaOPgM89CWThIlIX/AcyuI79cEGhul3Bp/y+eQ62oONyi8uASrARDvpX15t5T5sagDJdTwDyUd/Uo5XPvdjonCcceTZ1Jn7mHScp63e82nnboGPQugIOhkphPphAGoCnzdIMJ3LEhgSAi8Qm8KrUDimo2kMz0KqnXzyya7huOxIA1QsQV/SqgAjS3AkgAJQ7q0L+KgLdSKgje3IC+4kwe7MnIBRxzhUdDJ1BLBMCMCHHcygBFNtwIetSOKEt/6NVGXCAwjaxKCiORgHpCvBbAaec0w6JBgRBaQm16FxaBuDDHBYYTr22GOdSmWicR7TiTYjddEygJ9rcRIBJmNA+fQrZgV9Q/lIakCEkKA9hNm4h5Ut4pxMQMoHgLDX1/UCHzYLg4NkII5FJ3qDE+poBDMdjpqisoRk6GCAS6cEVyqUmal8YuthU7G0xcAAPqQCu1ahdkmjJwyDTVkf8DEBUBl0CJ0G0AlaY/dQ93Bt8tgDIBICQDAZcDgAY10lHyqbEA1mBOcJWOOkIZGQejhfSEb2kcGLRhPQl1xPGWgAQM9kxCHDW+dn/JFETCza1KdPH5fzyHlipVzL9r9oDVaHACdt4VnYsziW1BHQUw/aiCrmHurCmNAOxpeJwuTjmcRdsdXZxIlJgYT12lsv8EGsJpBTh12EqvNCKeEGxmOARuWYpQCErdJQG3QY7IEgmAEEkoMBxOgFfEhM7mOm83YZg8yMxQ4FfNiUdC4dxX01ATuYeRYxRaQngwD4+PVy2lbTpII5T9sITJPJw73YbAwsgAmmmsCHygewhG6Y2MOGDXOSnKU6tAd1ZNCR9nxyLxKKPiFriLoiHakLkgiHCMnHZKI/mLT8IA5r7zwf9cvkQnhwHpATIOd+7DWuAVxIM+oICBk7pCXLl9SH6wkpcT/9gOmBlAZsqHSAjDS98847t22FTFn1Bh83Y7NhI1x66aVullDhmlQvD/EGiJ8mwOMlNAI4PNULU7bH/M15JBIgB3wY8rxPy3lAiEfJKgQSFTWMvYXqYw/AXUnVYKZT6By8S2xSOhHjG4CEaw/sgRIwoaJQRyz18XximWRa1xV8xE15NhIGiQL4UF20g+uRWEgXzA/UKxLGc0oAH9IF6YcEBXg4LUg/4pL0N/XjPJOa5wFSVmhoC+BD/VIfVmVQl9jo9Am2HTY+YSxARV+REECAnXqy7g2QESr0A44bDgnSmXKRkvy92+CjA5E0DBJiGbuIWVYT+Ggc0o+HMTCobTqQTmWAqFAo+LxjzEKABchoPA3mHDOZSUB4BSmDGgbYDBhSkQGtLfgYDNQS6owlQAafzkdd7apd2LJMQNSfB1wkMmqHwQ2mXaldwMWAM5CYDahGykU1ItUABz8hdvrppztQIJUIthPnxBTB8eE8zycSgSTm1QUkE9qDvkGVUzaSnomdl5fnHAuAicqmTqHgY3yRwKweITGxR1nHRgoS2yTMhbQDfN4m6oCKbCBCYUhAjnnjUW/wQQw86g7Hw1t1qGmQYDodEY+xyyChWmgIHYAaDQZDMNNJSCGehUpEHXKcAQQsSETUFRIRkc9MQwXTiTtT6cFMh9ABSFKkClKZAfWk9c7axXHOI3GoE4PHBKFdqDcMbyRRMO0KfMT3UHXUhb+RONQJB4K+Q93SRjQBkxbAAUomKZMHe5Hn4+WiGtFMTHYmI9oAmw6A0TaeyydAoD3cB6gREvQ5djPl/fa3v3XjQ8wStYvZxfOoOw4P9UUAUQb2NhOIutOn1JNVLcCHEGkQ8NFoRDrGPgNPIRQWPDjBzEBxns5EIgBcbBeO1+QY0GhmGTMX4CGVkLpcT+fQWdhYiHq8Mgad0AQzjvuRaKFlhjLqGZBQL8qnXgTEAZanWsMxdQcQXIMdxb0MFvYX9QAozPZg2hn4PDWIcc4PYTPASE3qhYZAkjHAgBLpj7fJBMNGxbNEvQE2JJ2X84gTRswTcLBEybMYK7J1cFS4D+mIPUY7sN+QYryWSpuQfJg53APYqBOajtcYCPBjVmCX0naezfjSd4DbAx/1QxgQL0Xtetptt8CHyEXEM/DYXXQKsy3cIHnMg2gkjaWSSArUKbNhZyABfNgXDDQiHYlJozmHakINYXsSosDjw9DH20Ia01DPW66JAR+fSBfKpwzqizoNbUMwM0C0mYFnxlMPVBQSj0FjktDhwbQz8HnSl77BhEAN0icAEKlPmzErGGQGFHsOu472I5kAJmVh2+EYAC4kFZEJJhWeK+BmwJGGSCyAjq1MP9JX3IvNyeRhXLxQC9ILDUX5tBVwAVrup160BQGC9gO4qHX6nX6lbOxSzALa4rV3t8BHijgDgJrB62UhnkBkTZKCc0gTxD+zxxssOhQVEqx6+e79jbjmPgxngtuEC1AxAJJBIHRDZ3qeHzYGtogHvuCygpljqDs6idghCQosGTLTUaU8M1w7POYa6sDgY3dieGP7obIJATE5UV/BtDPwwXxHMwBob7BhtAzPYjJQVwYR1QgQkEYMMH3PtZxjgqNmaRPHeQ7AAMwMNMcwmwA1AAP49APnaRfHAQb9w73Ye4wR99KfPBvNgDTlHMe5n+upJ8e8unMf/QjYeE6DSD6IiiDSkRboeRpIxUIHyWPAx8PofEQ8wWaMYTqbWemBgcqgbgAdg0f2LxXmHpbT5s492w0SZTGLAR+iH8lHDArJh9pFYiKhKRu7ktlJ+XQK5TGoDBadQv2xKT2VR4fROeHa4TF14Fo8bPoAaUvdkR6ADw8wdEfTUPB5A+IxfUoZAME75/UJ9ff+ZrKi2mC+cz3naJvXf7SZ7155nKdMyuE8zDmOcV9wuV5fcZ46cZ77KYc+8+7nOu9+Prk/+JhXJpOGv71ymAC7BT5cbVQLEgxJRocyO3cl/TCQUQ0si3Xo0NGpGNx9GkVlmS3MHiqHukAd3HXX3Zo1+yDFGfjOOP00e87bNsuW6corr3DSCvsTO4eoPWD8zW/O1eP/WmCS6HU32EwMovQ0nOd4gwbA8WixjQAQzhDPZRLV1A6uATxIOe7DqAaw2KdeoJjkidA0+lDwUZ/6sjeY3oCGOxd6PFjKeuf5m4nP953dF8q1vS6UuYfn7bbkQ/UySIQWcOGJIzGQFBpuwDwGCPz8KYYvnio2AhV7y0T2w/+cr6uv+bNOPe0MTZg4Vd17Zio1LUOJSclu5QBpedppJ+uNJSSpvm1G/VWm9jMc+AHf6QZMromNjVPruFT17NVfWdNn64wzf62rrr5G997/gF6zOtB4ZjQzmftIHIWJR9WmDVyDWiPGhtOFbYWUY9YjRQEfqj8c+OgzJhUqDwlAXX5qjGkA8OoNPogOR8UQt2NNEInFzA43YB4zcASbsZFSUpKdhzYta7b6mRPStXsPZbRtr/iEZLVoGeWkSlRUC/Xt1UaZ3TMUGxOlo026vWSSgwbcdNONTurgXbJ6ctZZv3I/EBgfa/fZvdzfqlWMEhJTXLldunVXZr9+mjBpkq67/gZnGxErBNhIT7xq6l8b6Y1Nh62HzUsnMhmRrpgHOBzUJ/TNrGDwcY83+xuLeV7oM8Md25PMs+hD7GW+1xt8pI4T6MTxIBhK+MMrPNyg8cl5gHP9dde5kEtMQuA3dWON949rocP7Jul3JwzSrZcN0gNXD9KCv++nRXdP0eVnj1HbNgmaOesQ590hQQm+EpdjsLH/xoybpOSk1jrvVLPdbtxfj1w7QDdfmqnLTu2pU0a317i0aLWvBmVGl+4aNGxfZzawKkFoAjsutN6hDDiRWsTkKIfJgxqHUKWsNlAf7E5Sk4KJtXGeQcdH+HXXX6ERAahW4PNULwFK1iQxsgEXx8INHA9EOr726qs6yVz1FiYxu8W20vGd03Rz3ww9M7md3ruyv0oWT5A+GSt9Pkr66kBp/RS9cucs9eySqnETspy3hcpCZWI3EtsbMmSoqeh0TR3ZWR8/f4i0YbL0pd370UiVLh+lr/8xXK+OS9M93WN1Xo84Te4QpzYmJQEQTgqBYuzNcPWGqTszl/oTUyT0A/CpA04RxKRiJWBn4GOy4kR5hjxq+qfItB0GeGiDUKoV+CCWZ1iOYhCJEQG+ncXIkBhL7HPOOecoIbWNOreO0ZUD0vT9lK4qn95O+fM6Si/2k1b1klb2VNXynvbZxUZ1iFbcM1V9u6Zqv5HjXTgAD2r+/EcMAB3cs+FeHZNN2o1R1eox0rt9VbWsh7TCyljbV3q2r4qPjFf5yJYqmpygNbO76erpQzW0f6ZT1YRpCEFgFoST3ICPScVsJb7G81hUx4j2iHtxWgAf8bhQ8EWodlRr8EEEG4nwE13HOwVkwYPGYBIDYvDOP/8CpZj91cYcgwv6tjGhlipNiFLpkUkqvNWA8nYfA0xvaVk1rzAAGfhWPjBefbslq0/fIeZoXKunnn5GF5uhjz0HEFrHRuv84/ZR4Tsz7Pp9pOU9VGngrVxuQF7TW5WLeivvvA4qz4qVRreQb0qSNvz2cC186DYNHBbY5YrAKfWEQwGI1EPlYhcCLtpLzBFV6hH3kUWCCcJyX1FRUfWZCNWF6gQ+FpVZ0CbAix3GQAE0BhDwMSgAkoh6d/NyW9lA/7xjotZNSlXltBiVTGml3PPbq2zhPqpaaYADgMuq+W0DzzuDtXL+SHM6EtWyVazapHdUp85d7DPdOTutWrXUGT8bpO9fGCe9311VBthKuw/gwVUmSSuXZKrgxp4q+lm8qsa0UMV+LVX2q1HK/2ylrrnheqVntN22CE7skTpTdw98hFIAH+EVnBxigrQzmJD6xBpxgIjqsx9JhOpOdQIfqpclLrxGVhuI9KOC+GQQAeJNZtD3HzBArVOSdMKYgVp96D6qnGpSyIBQ8Is0FT7QxUDSzVQtoMvcDr5lBr61g/XB86M1JNO8YAMu3KVTsiYd2FNnHTtQN5+/v9YvmCV9aOBb2cndU7V4gKGhn1PdlSsNjFZmyUP9lHtkonz7m+Qb2kK5R/dS2fsv6YfNP+isuWe7crFfWS3BdAj23Jk8TDKylLkO7z4UXICPBErAx5JjBHz1ozqBD/LeJiPzgVnvhV2QIqxZDh8eeMnm6KMP1rq/nCn/oWbfjWuh4rGtVHxFd1W8Zer1vbbVgAsGn0nCd/op+81huv+PA3T5nL666ZJBevqWiVr+SJa+eNYcijfNsVhrvHqQqt6269+y+98wKbrUvq81EH4y0IBpoFzcUyVnpqj8QGveAS1UeliGyhfe7Or/2eefu3Vq6sj6LnE8QirUHzsPZ8KLCbKWy+pGKNFeygB8eOThjOkI7ZrqDD5iV2QwEHQlBsaAEQ5BingvDk2eOlkrnrhDVdcep9L9TPUZ+PJOSVXZfHMI1vQxldvZwGOAW2HgeYdP47dgk37LDUjrRpj3al7weuOPx0sfjAxctxKJ2d1ULOq2twMgEs9v5eS/PVbfL56kja8P0sYX99Vn87pq/aTW+mJUa/1nehd9fM3Z+uGzD1RiQMFDxXMmUI39h/RC2rF+ioeNQ0V4iHAK6694a6yS8EnMk3VrMlBgbEPPC45Q3ajO4GMtkQwGYn6nV+eFIT2IgwG8Pn37avXK16Tn/6GcmR1UOcKk3owolf3d1KJJKYBWhY22wmy2NzJVYQ6Cf4mBDknmScEV9jfOCKoZMNrf3OPug7fZeeYpm5frXztaL90xWReecIAuOeVAXXrKATpvSjfNHZios3un6Jy+PTR34nhdcu48XXPd9c6B8NarMSFIXSKLg50I8OixCd0kMnCRSUwGCkuFfJKihBdM0J0kCMBXe8nHXn7/K8x+e3zWn+oMPmJ+SDnAh/PB2ia5aHiFvfpk6qVFi1Sx9WMVXnmECoeYzTWqhbKPSVL54wY8U6tVzrEw4C3vqLL7eynnd11V/HC3gGTb5oAAxFD2zgUzIDX+aKaunnegkhPilZyYoBTj5Pg4JcVGKSk6WkkxsUqMjVNyUrLS2rRxAWfqjxMDyKg7khxpR1IDx5CKXEM6GcuDrHLwyd+oY95ZAHyEbYI3CQqlKhskmG9V8v9PsFRhjLTfcV/CulKdwQdhHxFuYaC8zF5WDx5b8JT8/krlvvSgNh7dQ2Vm8BdNjdbWee3le9nA8l5nVb5jNtnqvqp8PlM5Z6Xrx9kJKr7ZwLdqgEkxA1JYkO3IqFsn/d4mZGPA/HCSFtw8TgeP66XDJvbW4VN664isvjp8SEcd3jFDh3Rsrykd0nTI+AN0zNFH6qijj3EqlfcVcDwAGkwwGQCS0kU2ME4V8bxgJrMGT5f7PMlXs8OxI+gC0uJ/gZtA8kGkL6Gm2D0KKQHw7rn3flVQn4JvtPHCg5V7QIz8JvWKftZaRX81R2OZ2Xmf9DOgDFPFKwNV8OeeKpoSrfyRppb/0FkVSwYGwBccftkJV8HVNp87tmqQti4aqvceGqQPHhmsdY8O0ronBuvdS3po7YR0vTcsRcvGpmvFrZfog/dX6aOP1rtcQdZoybbxsl2QiOzEhTNFgJtECFKygpnMENK6yPatjc0H9CpsoPxusAKSwvu2tzJt2k78tV2614XqBT4Crth5SAkW3FluKy1jAKqUt/hB5R/eyYU4fOZtlhyVoLKH+qhydVfp0+GqWDpahdf1UOERiS4OV2ngK70AyUjsr3bg83gbAHFUVrLCYbzG/l5rf39o5+7tqsojEyS83hkxKnz4ClWV5AUaEUQsueFEAUBSwEheDc1UCSa8XTJs8HZJnqgZfAGwBQh1BQeO7y1M/YM5QNuvaFTwQaxborZ40dtbNK7YukEbLzcPd1KiKsaa1DPJV3KMgW/+Pqp4cx+Vv9hf+X/poYIjE13cjxCM7Brf3LYqe9bsQZyMIPBVYevhcKy0v/kMAh5hFud0mMOBxPTYnePaNd1V/GgP5Z2WrjJ7VsmkKG34/fHK/4/3Qy/bO4qtzQg6s/ZLpjNxvJo2AyeuicrFu/9v8HmDEqCqijyVF30iX/4Klecvkq/gJZUVLDZ+y/jNZs/lxn7jCo/z33RtqSj9xBr33/ss14XqDT66F0M7uONL31uknEM6qtw83IrJpk5t0IuPaq2SW3qr9K5M5V/UWbmHxKtsQgtVTbRH2yfgKz4lXcWPZAa822rwOalmYETFVi4x3ibl7DrCMth8AG6VXbs807FWGeNNc3yN1ePfPVV8sTk2o60+9pwfT9lPBasXVdcWBbKdWAjntUNWNsJtXh1MOwffdvvOI1/OYuWum6vsleaArZ6m3Henauu705T9btZewQVrslS8ZpqKqrnwnanKXnGY8r+4VhVlH1e3sn5Ub/CFUmnBZmXPv1qF0xNUaWquanJLVRi4CmdEK/vnySo6vLXKs6INeC1VYsfLJlUD0IBRcEyK8u80lUnczwDoSTSt2Ee+x/op/4bu8r/Q3ySggewN+1xqAFvdIXCN2Yrlzw5QxXMD7fgAO2bARIKu6in/v/up8JJOKjjAwGd1yj6mt4qXP1td4+3SySNAR5byrmjX4NsuNcs23K/C5YNUvqKD/G91l29ZT8flb+0dXGHst/pWGPvd393ke7O7CtYdo5K8pa6NgZ787/7cFe2W5MOIrqzu95IvVmrzvCnyTYySTOVqUktVGZdPbKnSsQZE7C6TPlXjDQh23G8sO+eW3Q5JNIAZkN4cYOAzdYrkeqeXfM9lKvvcjtpyRLJ8Jjkr3+5rUhE2gK60gXw6U4XntVPh8akqPClVBXPTVXK9OS9P9jX70a57Z5CKr+6qXPO6yw2AuQcnqmjRXYEK7wbVBXyl3/2fSpHMizuo8LZOyrumowr+ZBPiGmM+mztbPfON867uqMIbuqji8e42ybuo6INDVZT9imsjra4P7T74TMNU+StU9PJ9yp6WKr9JMqdOAVc1wFjhKDfQVRq7c4DOJKAHvvypscr7QzeTYkMc+Jzttrq/iu/oqS3T41Q4rpUKr+yq8ldNMq7pYsA0gC3tq8Jb+ih3arRKzLkp289sTANZ6cx4FZyRrvwbO6ts0UAV39pbuZOiVWGOTa7VI/+hK+X37d5yWJ3At+EulawaoooXzf48p53yZySqcGqCCmYkqHBWw3JRmGO7zdTTtFnhZOvXw1NUfGN3VbzeQ0Xrj1BxzquujU0CPnwcPn15m5Rz+8XKN8lWidQzleuBr9IYFVtqzHd33ICHBHTgs8/CMS1VeFF7m1GDTWJVg2/pIBVc0UV5owFvK+WemKqyf5k6/cgck496q/yV3ir8fWeVmheLc1MFmA3IlVaHPJNy2dPjVXShSZmL2yt/ZoyrV4nZonl/O1dlVt/dobqp3btV/M5gVbzcTSVz0m0StpJsIjjt4E1G46pq9v6uK3Ovv/oz+FgVTl3Qc+rKVVZPv/VrlU1s/9QYFf7JpN+rBr6PmxB8kPfQwi/Xauufjgs4EjQWUHlA2wWjmn02GL6z0001DValORCVq0zlPtNPeWe1VVG1vZZjqruMPMAPx0ifjpT/2V4qPTVNlROiVI5kpbOsk6vs2T6zJf32iXovMdD7jPGsqwyYBdefosKNgb2T60v1At9L3VSMWTA5Sn76yOsD7F6rn9+4wn0P9Mm28zUx/cw9xrS51DhQhrE5fHxH6zjwhbu/Fky5JZRjGq18eqwKr+ki/yvmyK0/UkU5r7k21g96u612A5S3+lVtnjM+IPUAgJtp4RsTygADe6zCgOR7zhwGwGf2Xv4dPZR/ZLJzXlCZOdb4oiut4UvMLnx/kKrm91X5YQkO7Dgu/zVg1VKVugDIKrvfZ/XLueoI5X2xJggedaf6gq/EwFcxJdrFN/2To+Un4XV8dX0nm0S0T2xh54x57dgVo2WMK60f6P9Km4RomMpJreSn7Z55E3pfLZm6lNun38ounh1rNmAXM3+ageTzujjnlfnadJR5oNh7Vkmk0DaHAiC62WjOhzUE9VthvEPjDHx+U6u+J/oZ8PB4Byj/vLYqGBnlxH6ZdWyhlZkzp51KnzTpt26Aqh7uq9JZ0SpF1VaXtVOuBl+plZV7yXQzlpfWs7sCBPh4ER7wEWyvC/j8Bj48/EqzQ8tnx2vj1GS9PqqTPplkkj8rxk2kYusT+iVgI4dpj2uTnZtigJ1pAJ5RDWJrX9HU1lo2IV2PDU3RZxMSVWk2sdf/9WHqgQYB2EUHNSPwQSwebZ1/rTZONikE+AwoDlDWYGyFQniK/W0M6EqrG7RD40y6+Y4wT/TOni4ZtPyp/ubBpqhsODPXzht4cFiyf5aoglt7yL9qmPz323VZUSoxVYqKZdBQXcEdt42ZBFY31F3OnDHKX/lSde3rR/W2+ZB8k6ICAXarU4k5WgvGpmlaxwydk9lOH00xST+jlSpMkjlVZwPubENMCtpn7NpprKktlTe5tVaPTtHqUSnKmxjnrivLStUTB3bXzNQEPbJvhkqnJlof2PWuHwLlbOPQfgq9BmlqZTK5kXzNBnze46pUppzbztNWM0hRgQ5gZm8g8ksMVD9kJWjjiV2Va15rBeqGTrdrnGQ0duAzYBRPb63ca7ur0tRq/jVdlW8ivnxiK1VNscGy2Y/tkm+qJOfXGcq9uZcKL+7gVEu52XwMRrGBkHVit2ridaTHgI8Bt3NbThyorSapd4dIu683+MYHpHnV1Fb6bFSsTuvaWkmxLZQWF6e/DG+jokMNLMRIrU30oWvPVOODTYIdZDzT2PpXM6O0fmKqruzVQdf2ba8N05PtvPXV9CStH99ZN/RJ15IRGSozgDogTbE+mMH9BlLrW5nWAMDbQWifWSZJZ1BG9XU8i2czXs0FfF4X88gq+VR0yzkq3NcqyMyziqI2sEEKxkXrmzP31+abT1DuIe1dWjszCcMYW8/FAasbVjY5RgXndlTp3ZnKPSnF7jVpOS3K1IZ5qjYIZXYPZRdkRWvr7DjlTzcv11SNf0qMfEd1UPav9tOmEwepzBtcpGEw+BhEwHdYF2195o5AQ+pJJJ6S9QL4dkwsqAX4JtpksfpVzm6tp0cma1hMK81oF6d2sS11RNckfTs9I6BOAQW2nEnKz8bF6ZnxrfXM2DitHNNaWyfFabNN6tuHpWt8WlvNbJ+mW/drrfWT41Rik3xzVopWjeuqLdNTDVAGpqlRKjMpu3ZMvBaMTNQTo1vr7Qnxypkab+cAc0ttnWiTYXysvpyUoPdNXf9rZIKeted9OrG1OR3RzUftBoOv0sBXevs5Kh5hgKoW0QCLhIHcgzrrq1svUs6Lt6vimF4upR0pBjBDDWrUiW9GjHKOSFChgQ4gO2PaO7/tOrvfykCClhko/WNaquDyI1TwyVIVrliozb8aazaiSUTrLGyVbWUwmCb9Ns9qp60Lbg00pJ7EHiwAj/c82N+O32QLUA3gC7b5rP1lM5J184i26pMQrdsGZegX7RI0KyVeS0a2UYV5lS4cZZ+rR6fq5E4p6hQfq24JUZrWJl6PjUzXC+M76tBOGUpqlaCM6Ch1jI/Sb3rG6aspKVp4YKImpsVooQFNB8fLNytez45I1rS0eHW253VNjNK4tom6bViGATXRaZfl41J0evcUndg5Vaf3SlUXe1aH+FY6o1dHA20b57gVN1fJV2CSD6nmAalkmEmZM0Zqy8qFKnp7oaqONUfCAOo6FSlUDabtHLi/yBrphRx2ykg141Irh7StkhvnqCxviyr95Spc/rRyzjjAJRMA0Eoz4t091A3wzWyrrU/cEmhIPQnwkdFSH/A5B8Dq/fHodJ3Tr6uO7hytZTbw9+6bbuBI0RV9k5zJITMpNs5I0ym9U5SZEKvL9knUffsn6Q/9k3TPoFi9N7ad7hvWS5PbIPlSdfmQDL06Pk3fz8rQbQekGyBb6K+9W6n0oDg9tX+sxhvoJpiEvWZ4uu4b3V4ndk/TgWkJunZgjNmX0XpvXDeNSm+njnFJumCfdjYxMnSW1aV7Urz+YM+uMMlZYuAjztfE4CMxiBw1qFJ591ymrftZUSZt4FIDYvbsjsp//AaVF2WrePm/VXhEL1WY2t05+Oy4MQDcFoAOOR/MXIsDQVDZd+PZ8m36PlCvyhLlvXiL8g5u59K6hM3IPQDabMvNB3dU9tO7p3Z3B3xVSD5zKh4YFq/RBrYbBsUpd2ZrfT21nQ5ql6oZHUz6z06wa+K0eEKaxplEPLJDmr6b3llVJsG+mhij962vS0wdrpvQQad276Aze7XXe1OsbFPlvunpunP/ruoQ10p/6WrjMDVd5/dKU5fYKN07Mk2Fs8w2nJ2ktw7soIkZbTU6vaW+mBSvdyd10gGpSRqRkag3JrZT2UEpVmaqMpNb6chOScodlyq/edZF13RW+WtNDD662Ovy3Kdu1WbrDP8Qs8msYzafMER5j1/nUqy4tmTdUmUf2cuBsibwOQZ0tQCfYyuHwHHxTWepeNOXNuSBYS8v+kFb/zZHuTZ4FUhbrq0G35ajM5X98sOu3vUlXphnz+S6gq90bhs3GSpnJurSfvFKjWqpy/unaMnYFL05ppsmpqepnw32u5PN05+VqIeHJymrfbyu6ZdiEjwt4GjgzCHFzTlYOz5Bp/XK0Nw+bfXxRFOx5hxUTkjR7YM7q3NctG7fJ1lfTu6mI7ukaXC6gXVGe8lMGk2x62a11UV9M9QrKVqvT2mrxdMyNCk12lRvgvJnma1oDtGmrCQdmBFtEyJZn49KVYWBr7ipwQfxOK+Ls5c+pR9O21/Fh3Z1yQU5b8y3AQm814B09H3zrrJP6O/eZCPo6by4UCAFMXajA6h5y0jS/4rjAUy4GnxFN52p4s2f25OoVaAjir96Xz/+/hhlHxgTWHLiWlO7W389Wrkrdi/Ugrc7ceJEB77QF8rDga8E8L3Y3a1w4AB8aTbUCV3TlR4Xq593MfXbu50u6N/TpE66OidF6YZ9k5Q3PV6PDs3QtHYp+nN/8zynmddqgPAAqFlRWjU2WSd1a695me306SQDX5aZLBOS9feB7dW1daz+uX8vfTazp2Z1jnXgWzu9XUATTLO+O7SNfrdPinomRuvVcW30hk3UiSnROqtrnEpnWFl23XdTkzQyPVqTOsabWk5warfYbL5msbzmUfbn7+jb+X9WwVN/U/mGj1RV5SnkAPjKNqzT96ceEEhtMgkUHOcLZVKxWNIpN+/XPy3JPmOdp4uNt+06T3pWg6/sBrP5Nno/ox54Nv9vXvy8NvxyhEpM4lWZA1Rm1269wpyTL99z19SFSC5lTxYynAkss/s7afSEWtgdlS0zSEoNBR+JBaWA74XuKpjbTv7ZyXpoaJpGG6iyOiXoj5lpuqFfG103gFhfivZtG6eZBpZPJyfoVZOGWW3tePd05c3qIZkq9Fl/FIyPNvUarZWjknR0+/Y6uUdbfTgxxYVPKrPSddewbupi4HtgWGdtPqSnftEzXn1TYrVkUjtT+wZkK+OrCZ11XNcOGp7UQp+MbKWV5t0ONOAf3c3AZ5JZWdH6zvr/AAPfxA6t9b55ymXV4POW15ocfHR1eXmRfIWb5C/dcXtYj8qzv9Lnp83QJrP5AJ5baw0CnGMAZrPNPzWw9lliEjTv7kuVf+kslRrwKg1AgM55ryHgKzXw+TZ6P8RCV1SIdNCCslLlPPpnMwliVD68hfLt+Tl/n6eSPKtr4OJaE4mzvNfB5tlslE2oBea9X7bI5V3e/HwvRX/7YHhq1/9SV5Wd01ZFs3vorM5tNNjU3b37Jen7KQnaMjVeWyZE60tzPM7p2cZ5mg8ckKL3Z3bWwZ2TNMiA88yYjvomq5eeHtFD95pk+2x0rD4eFas5XdMMrAlacIABzdRq/qyO5rz0UAez8W7uFa3cGam62lR8ZkysLu2foWVTzD6c2FNX9e6ikeZdn9ujpbZOidVyU9f9kmN0lEm+Yge+KH1j4BvRJkaT0mP10X6xZi4EwNfkatcjb57z+J1VwV+wSd9dfLQ2j41yS287XQ4zkKGSC8xjK154m8qyv1fB6w9py+HdXSCacySobrMJw4IP8qnEakX0rcxswS3Xn6WN4+O04chMFS5ZYFLM7+pdF8KuI77HBkFsm+a9NI7tR9iFl83Lqt9jCWfzVb3cRb5zMvT5lB6anZykKSmJJt26SNPNLDDP1nnj0+P09PA2GpOapj8NStV3M5M1f0SihmfEqFdyrEa2SdbUhGRdYWD7wqRV8ZQkPTysiwbFxyozKUG/y0zUt1M764kRvdQpOkrXdGmhvPGt9MGkJF3YL10HpCRpYJt4DTVHZ2hKqub16aAPzWmpmBarxSb5xsdH6zdtW5lwMNUM+LKSlZUapWPTk/TViBQX+gm2+ZossQDCwHc5fc73LXef4apSUZSrDdf/SlumJ1YvfgeCyzvE+kyiId2Kx7TU5j8codIf1rt7S7O/1o9/+aUKJsW4NV6/DRRxQlZIkH7B4OPJAaejwtUs8LcB4Ov1yn74KuUuekAVOZvNLGDSbAdIbYlMZ14u4ncp2GqDXaz48Rbe5Pv000CmTDi1i81X+ZKp3TkGPnMu7uzXWo8OS1PpZHNArC8KrU981hZNjzKv19Ty/u31/Jg05UyNUd6UGM0fEq0zO7XQid1jdXmvWC0d3FJFrNhMT9C3k9vp5h7ROq1btP5vSJx5t6laPzZVN/VspSXm7RcyUc1z/tw811sGxOvUHnE6qWes/tg3Tu+OyZAObm+gitMXNjkfHJSglwablqAuNrnzTUXfMSRFDwxO05aRxAurvd1qm69JwReQHygwQMcWYuHB5y8p1qY7/6jsQzu4uBzg8VY4giVfudllWw/qoPwl/zRJw7uwVnqlTwXLn9aW2V1UZA5I1eRAChUJCk71Ar7rfy3fjwHwUSOmQWAiBNdn+xZnVX7gUb8uI8zCFrvseMCuBfwUF6scFRUBRR4OfNh8/hd7KPvXbZU/LkolZgZU2IBXmqlRYeBwy404EWZylE9vrSIDVb5N1KLJrQLr1XadJrYybzPR7LEkVU6OdhqkZGpLVZjXy0QstftIVCi3v1lBYsmx3MoswzvmfpbXZseazWllzE4y29HsQ7SQ2XZ+k3zKsjrNSrBy4gJxVvrW6rbV1PYWsz9LzF4vOnjHIHOTgi8AvF0/utJsr/xHb1XhUT1dehTgc2rTAx7fbSb7JkRpy0WzDUjeRoyBAfVv+U5b5hxsA2cdZfeifgEv353ku3mufJs3uGtReki1QCAINYgUDNQRSNRd3u1IOBz8rgi/eonkY1d6NrAMUODp/wU+Mpmf76Xss9rJN9ZUrA0knjeS3GPXJ9YulgbpCyYWKziA08VPkXR8t0/WuQmwcx8Sk8nossVDjvFJuTDHXW6fMf3HEp/3HDSOlxTi6gBXH3fH7Fr/CNNKM2JUEBRkLtrB5qs7BK3kPU8VPp9+fOZ+FRzTz4GPZTgntQCdqVsXVN7Pjh/C0teNKqt+t9aL21X6SpT97G3KP7qr/Ha/CzAbl1mnEGQuu+s8+Yp3/AmqQGfUr1N2RexMxU70hFt2lVhQ+r2Bb/kwVTy9j3LmtHdr2BptJgbr0kGM3Vdhkq7E+qO0mvke/LfHXBfI1wvcS1keh/4derzKuMz6bofn8Ldx8DO8Z5dV/11u5lD5zLgdkkkLc16vbiltDq/1aqJGAV+lGVl5a99Uzmmj3LKb9y4HoHOpV/bdN8gcjeP2UcnnK1RRZY0xoVdp6jEgW02V5r6vvDP3Velgu99UiZN8zF7Ad+/58pXtXmp8XYjf+OBnEdg+g9/52E7/DT7ncCwfJP+i3ir5Ww8VXtRJhfM6quj8EL6gowrtM/8CMzvsO58F1Z/Bx/gsNC42/q8ywnKHat7+d6Bcj72yq7/b+W287XwHq7OVcWkXldzdW1Wv91LJOvN2ty62tkKeltne7tpQo4CPCpZv/Ua586araIA90iQea5zMRB8RfwNf0bhEbf7jSfIX5wakXbkNpJlp2+dSkfLuOF8l09oF3ivAFrLPUpOEhXfNk680sFN8YxCbJbEpJj9NteM+LWEk37e3q3gp76R0NI+3q3zPdVXpM11U9mwY5nhtOdz9deFwZYbh8qe7yfdMV/eduvsXmYe+tIOK18xSyebA22sB0NXOBAumRgAfAwKY8pVz2WEqGIjabKVy88AqJ5jqyIp1mzjm/XwfZb++wElJrscp8MbQ/W3/lX6x0mb8BFWY9ENykrmSY/ZT/gO/k7+icTflJvSC97vjzgah4KuUb8uTKlp7mHyrxsu3ZrzK3jN+v/ozlDm+s3Me7+p8bTncs7xjwfzeBPuE+W787hhzoEyDfX6hfIUfuJbCjFFdqVHAF6BKbbxprrnsLHcZ6KaZ7cOnSUAAtPXiw+XbFPBYAxT45oaTr0h2lSn/nvOUt19rZ7CXGGfvb4bwgr8F3deURG09SxWqsEn3hUqzF6rou3tV9O099nnfXsUF39+nQuNtx2jDt/eqoniVtbPUyTumW336vxHAt51+fOIObT6sp7PT3IqGMV7YxlkZ2vrIddVX7UgB8FnTHPjM23z7GW395Qi3/UWpcfZIM4hfvM+dq18X7Gkyb7uqVFWVxcZF1Z97EVdV8w7H627fhaNGlHxSzupFyps7TjJphd3mM4cjz75vvniW8v+zYqfNoQTUMefLcr/Sltvnauu4QFww59DOKl72jLsuQnsX7XHwBRSRfZp8LvnhI+VdcZjzeIkx4a1uyspQzlN/d1kwiPBwBPgCsTuoXDlrXtbXvxyl/BEGvnMmqOSzldXnmitRu/8lbhhqFPBhs+G5VpblKffu85UzOkrlpjILjDf9/mgVff2Ruzac5AuAFzM+AD80sK+4QJteeFDfnJelvAU3qCJ3kxn+DaEIItSY1EjgM9j4A9AoWW422y/6a4t5uBtO21cFy56T31/u1Go4+ATAFzDi3T/nfZj6Lc3Tj+sWq3TrVyYW7XglAI3Ab2+iRgCfpzIrnM9Qmr1JefdcoR/mjFbOq/epxFdg543KAU61V7EL4ko4AMMABeRjBHx7E+1x8G2nqkCOnSGmPHuDfF+ulr80WyyklYC5cqAUDKcI/a9TI4LPL585C2Uh8slnf1VUonYjSvOnRo0APqQZoo3YEEtRZJkEE6lOpXYMGEbg91OiRgJfILUpwAGA4UgEPomPA8D6xskjtLdSo4AvoGi3A8t5wHaMI4GV0AjoforUiDZfhCIUTNL/A5WeFfgCrsB+AAAAAElFTkSuQmCC)
Which law is being expressed in this image?
![](data:image/png;base64,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)
PhysicsGrade-8
Physics
The forces involved in the Newton’s third law acts
The forces involved in the Newton’s third law acts
PhysicsGrade-8