Question
Find the number of non-colinear vector producing zero resultant.
- 3
- 4
- 2
- 1
The correct answer is: 2
Related Questions to study
Volume of a Cuboid is 30 cm³ and its
= 5 cm, b = 3 cm Find its height
Therefore, the height of the cuboid is 2 cm.
Volume of a Cuboid is 30 cm³ and its
= 5 cm, b = 3 cm Find its height
Therefore, the height of the cuboid is 2 cm.
Find the altitude of a triangle whose base is 20 cm and Area is 150 cm²
Therefore, the height of the triangle is 15cm.
Find the altitude of a triangle whose base is 20 cm and Area is 150 cm²
Therefore, the height of the triangle is 15cm.
ABCD is a Parallelogram DL
AB and DM
BC If AB = 18 cm, BC=12 cm and DM = 9 cm then find DL .
![](data:image/png;base64,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)
ABCD is a Parallelogram DL
AB and DM
BC If AB = 18 cm, BC=12 cm and DM = 9 cm then find DL .
![](data:image/png;base64,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)
ABCD is a Parallelogram, DL
AB If AB = 20 cm, AD = 13 cm and area of the Parallelogram is 100 cm², find AL.
![](data:image/png;base64,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)
ABCD is a Parallelogram, DL
AB If AB = 20 cm, AD = 13 cm and area of the Parallelogram is 100 cm², find AL.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIQAAABaCAYAAAB5cP74AAAJoElEQVR4nO3de1BTVx4H8C8gb4tRMQUdlIUi+F6Rrc6qu1TXYZVScdZaH0hAYKwS5Dn4rFYillHAGXcYHYQ4XqhbFZXBuOuuD1YeJgGERddaFKulPjCyFm1ieObuH1rkokUeN7k3yfnM8Icmc85vyDfnnns4J7GgaZoGQbxiyXUBBL+QQBAMJBAEAwkEwUACQTCQQBAMJBAEAwkEwcCrQHTU7oCvnQOGC4UQCoVwdh6DSQuTcKK+jevSzAavAgEAli4h+NuPKqhUKjQ9kCN9SjlilqVA2cp1ZeaBd4FgsB2LhZJ0hLTkI7e4hetqzAK/AwEAttMwzfsZ6uueQMd1LWaA/4FAJzo6dIAF13WYB/4HoqUa1XUj4TNRaATFGr8hXBfQq5YGnNu5DSedVqNwri3X1ZgF3gVC15iPFW6FsLEAdLQtRn8YggMnv8CHJA/s0b3Ak3v3oKKd4ekphF23hyzIBhlz0oY7BVvw+ZZvUG/vipGtD/DA+iPsyMvG5791BGAMcwiCNS2KFHwaW4W50hrU11ai6rtbkK18gB2hu6B4tfbH2xHi8uXLUKvVcHV15boUoyUQCODh4fHqXy2QRXyABMd8XN/vj64rcOu3+MfpJ5iw5I9wtwVA81BxcTENgPwM8ufChQuvf6kd9fSe2U500OHmXn/3vJtUNjc3QyQSYcWKFXByckJWVhbXJRmdqKgoCAQCzJ8///V/WljByhLQ6Xq/IPAuEGKxGAEBAXBzc8OjR49gZWXFdUlGpbCwEFVVVaioqGA+YOmKqZNG4EB1NVrWzHt9Z9GmQMbaYxizPR3Lf2PFr0nlsWPHoFQqkZmZyXUpRqmxsRFisRj5+fmws7Pr8agt5oatwnsnd+Crsqcv/wyga0ZF5jZkVFphzPsv33i8GSHu37+PmJgYFBUVYejQoVyXY3RomkZERATi4+MxderUtz7HduY25Kc1QrTMB9T77hj+8z08cFiAnflfYq7Dy+fwIhA6nQ5hYWGIjo7GrFmzuC7HKGVnZ0Or1SI+Pr6XZ9lhoigHlaua8cOtBjy3dYFXj4UpXgRi//79UKvV2Lp1K9elGKVbt25BIpFALpfD0rIPs4AhAoybKHj7QyzX1m83btzArl27IJfLMWQI5+UYnfb2dqxevRrp6elwc3MbdHucTirb2toQEhKCtLQ0eHl5cVmK0UpNTYWXlxeWL1/OSnucviW3b9+OsWPHIiIigssyjJZSqUReXh6uXr3KWpucBaKkpAQURaG2thYWFmT3S39pNBqEhoYiNzcXAsHb5wMDwckl49mzZxCJRMjJycGoUaO4KMHoJSYmIjg4GP7+/qy2y8kIsWHDBixcuBCLFi3ionujJ5PJoFQqoVAoWG/b4IEoKCiAUqlEdXW1obs2CSqVCmKxGGfPnoWtLfu7hgwaiIcPH0IsFkMmk8HBwcGQXZsEmqYRFRWFhIQETJo0SS99GGwOQdM0wsPDERMTAz8/P0N1a1KkUim0Wi3EYrHe+jDYCJGVlQW1Wo2NGzcaqkuTcufOHUgkEly5cqVvq5EDZJBA3Lx5s2tplaxG9l9HR0fXauTo0aP12pfeLxndVyNfb+ci+iMtLQ3jx4/H0qVL9d6X3t+uO3fuhLu7O8LCwvTdlUmqqqoCRVGoqqoySH96DUR5eTkoikJNTQ1ZjRyAFy9eQCQSQSqVwsnJySB96u2S8fz5c4SGhiInJwfOzs766sakJScnIzg4GHPmzDFYn3obIeLi4hAYGIiAgAB9dWHSzp07B6VSifLycoP2q5dAnDp1CgqFgtW/wpmTpqamrgU8Gxsbg/bNeiB+2egpk8lgb2/PdvMmj6ZprF27FgkJCfDx8TF4/6zOIWiaxpo1axAbGwtfX182mzYbFEVBq9Vi3bp1nPTP6ghx8OBBqNVqJCUlsdms2bh79y4kEgnKyso4uytjLRB1dXVISUmBXC4nh2sGoLOzEyKRCBkZGXBxceGsDlYuGe3t7QgJCcGePXvg7u7ORpNmZ+/evfD29sbixYs5rYOVEUIikcDDwwMhISFsNGd2ampqQFHUm8fvODDoQMjlclAUherqarIaOQBarRZhYWGQSqW8OLE2qEuGWq3u2ug5YsQItmoyK5s3b8aSJUt4c2JtUCNEfHw8goKCmMfOiT47f/48lEolSkpKuC6ly4ADUVRUBIVCgcrKSjbrMRtPnz7tWsCztrbmupwuAwrE48ePER0dDZlM9pZj58S70DSN9evXIykpiXcn1vo9h6BpGpGRkYiLi8O0adP0UZPJO3r0KLRaLSIjI7ku5Q39HiEOHToEjUbzjmPnxK9paGhASkoKSktLeXlX1q9A3L59u2s1Up8bPU3VL5+DkZmZCaFQyHU5b9XnV7X7Rk82jp2bo3379sHHxweBgYFcl/Kr+jxC7N69G56enqwdOzc3165dA0VRkMvlXJfSqz4FoqKiAkeOHCEbXgaotbUV4eHhyM3N5f2JtXd+kq1Go8H06dPh7e2NmTNnGqoulJWVQaPRmMQWvJqaGvj6+hrFRya9MxAXL15EQUGBoeoxSU5OTkhNTTWKQ0q8/axrghvk3tEQ2sqR6G0Lx+Evv35y1MhRGDcrEodv8O+rBt8MRMd/sGOGHQR/PoAG8q1n7LFyR8TpH6FSqfDkf9/jxIJabPriOJ5yXVcPbwSiVUHhlH0w/vRDHvJudnBRUw9tKE+cCO8N/wb/3k8D5Qg3NyGsQYNv1+sesxwNLlFnIAg6jcSfViJSqkRSxmyQbzdiga4RZzZ+jO+GWYBua0Jd/TDEyj7DSK7r6oEZiJ/+jvzz4/Dplon43c9/gWNQDv755Wx88h5H1ZkSi2HwW70J0ZOtoGtpwo2CNOwVZ2DepS2YYdizOL3qFggdHhfm41+OY/H7K8dwgnaAu9UZSE824uMwFzL7HCwLe7hOngN//5fj7by5nSgdtxeyumTMmMKf29HXr7OuAce/VsDFcwiul1zG5dI7EEwQovTw1/i+k8MKTVIHHhVfwnUrd3wwmj9hALqNEJ11R3H02z9g83+zsfLV9kidisKTyRk4XBOLVD9+FW50Ou8hd4kbvrGxgAVoWAmmYNlfs/EZzyYRr17lDtTkH0fDR9uwqNteWUvhJ1i1YBOSc4qxxW8BHLmp0fjZzEZGXSsyuK6jD4xgpbIN5YlTMO+gCsMcf9l7aI2pyRdwIWkCp5WZIiMIBGFI5OaBYCCBIBhIIAgGEgiCgQSCYCCBIBhIIAgGEgiCgQSCYCCBIBhIIAgGEgiCgQSCYCCBIBhIIAiG/wNbBjSXrJCNxgAAAABJRU5ErkJggg==)
The base of a Parallelogram is twice its height If the area of the Parallelogram is 512 cm², then find the height
Therefore, height of the parallelogram is 16cm.
The base of a Parallelogram is twice its height If the area of the Parallelogram is 512 cm², then find the height
Therefore, height of the parallelogram is 16cm.
Find the Area of a Square whose side is 63 cm
Therefore, the area of square is .
Find the Area of a Square whose side is 63 cm
Therefore, the area of square is .
Find the Area of a Rectangle whose length is 10 cm and breadth 6 cm
Therefore, the area of the rectangle is 60 cm².
Find the Area of a Rectangle whose length is 10 cm and breadth 6 cm
Therefore, the area of the rectangle is 60 cm².
The perimeter of a Square is 144m, then the side of the square is
Therefore, length of each side of square is 36m.
The perimeter of a Square is 144m, then the side of the square is
Therefore, length of each side of square is 36m.
Find the perimeter of the following figure.
![](data:image/png;base64,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)
Find the perimeter of the following figure.
![](data:image/png;base64,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)
Find the perimeter of the following figure.
![](data:image/png;base64,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)
Find the perimeter of the following figure.
![](data:image/png;base64,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)
Find the perimeter of the following figure.
![](data:image/png;base64,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)
Find the perimeter of the following figure.
![](data:image/png;base64,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)
5.6 m ....... cm
Therefore, 5.6m is equal to 560cm.
5.6 m ....... cm
Therefore, 5.6m is equal to 560cm.