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#PRODUCT_OF_VECTORS If a=i-2j+3k, b=2i+j+k, c=i+j+2k then find |a x (b x c)|, |(a x b) x c|
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JuniorInterMaths1AProductOfVectors
Product_Of_Vectors_Formulas_Synopsis
Junior_Inter_Maths_1A_Product_Of_Vectors_VSAQ_2_Marks
Junior_Inter_Maths_1A_Product_Of_Vectors_SAQ_4_Marks
Junior_Inter_Maths_1A_Product_Of_Vectors_LAQ_7_Marks
If the vectors λi – 3j + 5k and 2λi – λj – k are perpendicular to each other then find λ
If a = i + 2j – 3k and b = 3i – j + 2k then show that a + b and a – b are mutually perpendicular to each other
If the vectors 2i + λj – k and 4i – 2j + 2k are perpendicular to each other then find λ
For what values of λ, the vectors i – λj + 2k and 8i + 6j – k are right angles
Find the angle between a = 6i + 2j + 3k, b = 2i - 9j + 6k
Find the dot product of the vectors a = 6i + 2j + 3k, b = 2i - 9j + 6k and also find the angle between a and b
Find the dot product of the vectors a = 2i + 2j - 3k, b = 3i - j + 2k and also find the angle between a and b
Find the angle between a = i + 2j + 3k, b = 3i - j + 2k
If a = 2i + 2j - 3k, b = 3i - j + 2k then find Angle between 2a + b and a + 2b
Find the angle between a = i + 2j + 3k, b = 3i - 2j + 2k
Find the angle between the planes r. (2i - j + 2k) = 3, r. (3i + 6j + k) = 4
If a, b are two non - zero, non - collinear vectors. If | a + b | = | a - b | then find the angle between a and b
PerpendicularToEachOther
If a = i + 2j – 3k and b = 3i – j + 2k then show that a + b and a – b are mutually perpendicular to each other
If the vectors 2i + λj – k and 4i – 2j + 2k are perpendicular to each other then find λ
If the vectors λi – 3j + 5k and 2λi – λj – k are perpendicular to each other then find λ
For what values of λ, the vectors i – λj + 2k and 8i + 6j – k are right angles
AreaOfTheParallelogramwithAdjacentSides
If a = 2i – j + k and b = i – 3j – 5k then find | a x b |
Find the area of the parallelogram having a = 2i – j, b = 3i – k as adjacent sides
Find the area of the parallelogram having a = 2i – 3j, b = 3i – k as adjacent sides
Find the area of the parallelogram having a = 2j – k, b = – i + k as adjacent sides
Find the area of the parallelogram having a = i + 2j - k, b = 2i - j + 2k as adjacent sides
Find the area of the parallelogram whose diagonals are 3i + j – 2k, i – 3j + 4k
Find the dot product of the vectors a = 6i + 2j + 3k, b = 2i - 9j + 6k and also find the angle between a and b
Find the dot product of the vectors a = 2i + 2j - 3k, b = 3i - j + 2k and also find the angle between a and b
Find the angle between a = i + 2j + 3k, b = 3i - j + 2k
If a = 2i + 2j - 3k, b = 3i - j + 2k then find Angle between 2a + b and a + 2b
Find the angle between a = i + 2j + 3k, b = 3i - 2j + 2k
Find the angle between the planes r. (2i - j + 2k) = 3, r. (3i + 6j + k) = 4
If a, b are two non - zero, non - collinear vectors. If | a + b | = | a - b | then find the angle between a and b
Find the Volume Of the Parallelopiped With Edges 2i-3j+k, i-j+2k, 2i+j-k
Find the Area Of The Triangle With the Edges (1, 2, 3), (2, 3, 1), (3, 1, 2)
If a = i - 2j - 3k, b = 2i + j - k, c = i + 3j - 2k Then Show That a x (b x c) = (a x b) x c
If a = i - 2j + 3k, b = 2i + j + k, c = i + j + 2k then find |a x (b x c)|, |(a x b) x c|
Product_Of_Vectors_Formulas_Synopsis
Junior_Inter_Maths_1A_Product_Of_Vectors_VSAQ_2_Marks
Junior_Inter_Maths_1A_Product_Of_Vectors_SAQ_4_Marks
Junior_Inter_Maths_1A_Product_Of_Vectors_LAQ_7_Marks
If the vectors λi – 3j + 5k and 2λi – λj – k are perpendicular to each other then find λ
If a = i + 2j – 3k and b = 3i – j + 2k then show that a + b and a – b are mutually perpendicular to each other
If the vectors 2i + λj – k and 4i – 2j + 2k are perpendicular to each other then find λ
For what values of λ, the vectors i – λj + 2k and 8i + 6j – k are right angles
Find the angle between a = 6i + 2j + 3k, b = 2i - 9j + 6k
Find the dot product of the vectors a = 6i + 2j + 3k, b = 2i - 9j + 6k and also find the angle between a and b
Find the dot product of the vectors a = 2i + 2j - 3k, b = 3i - j + 2k and also find the angle between a and b
Find the angle between a = i + 2j + 3k, b = 3i - j + 2k
If a = 2i + 2j - 3k, b = 3i - j + 2k then find Angle between 2a + b and a + 2b
Find the angle between a = i + 2j + 3k, b = 3i - 2j + 2k
Find the angle between the planes r. (2i - j + 2k) = 3, r. (3i + 6j + k) = 4
If a, b are two non - zero, non - collinear vectors. If | a + b | = | a - b | then find the angle between a and b
PerpendicularToEachOther
If a = i + 2j – 3k and b = 3i – j + 2k then show that a + b and a – b are mutually perpendicular to each other
If the vectors 2i + λj – k and 4i – 2j + 2k are perpendicular to each other then find λ
If the vectors λi – 3j + 5k and 2λi – λj – k are perpendicular to each other then find λ
For what values of λ, the vectors i – λj + 2k and 8i + 6j – k are right angles
AreaOfTheParallelogramwithAdjacentSides
If a = 2i – j + k and b = i – 3j – 5k then find | a x b |
Find the area of the parallelogram having a = 2i – j, b = 3i – k as adjacent sides
Find the area of the parallelogram having a = 2i – 3j, b = 3i – k as adjacent sides
Find the area of the parallelogram having a = 2j – k, b = – i + k as adjacent sides
Find the area of the parallelogram having a = i + 2j - k, b = 2i - j + 2k as adjacent sides
Find the area of the parallelogram whose diagonals are 3i + j – 2k, i – 3j + 4k
Find the dot product of the vectors a = 6i + 2j + 3k, b = 2i - 9j + 6k and also find the angle between a and b
Find the dot product of the vectors a = 2i + 2j - 3k, b = 3i - j + 2k and also find the angle between a and b
Find the angle between a = i + 2j + 3k, b = 3i - j + 2k
If a = 2i + 2j - 3k, b = 3i - j + 2k then find Angle between 2a + b and a + 2b
Find the angle between a = i + 2j + 3k, b = 3i - 2j + 2k
Find the angle between the planes r. (2i - j + 2k) = 3, r. (3i + 6j + k) = 4
If a, b are two non - zero, non - collinear vectors. If | a + b | = | a - b | then find the angle between a and b
Find the Volume Of the Parallelopiped With Edges 2i-3j+k, i-j+2k, 2i+j-k
Find the Area Of The Triangle With the Edges (1, 2, 3), (2, 3, 1), (3, 1, 2)
If a = i - 2j - 3k, b = 2i + j - k, c = i + 3j - 2k Then Show That a x (b x c) = (a x b) x c
If a = i - 2j + 3k, b = 2i + j + k, c = i + j + 2k then find |a x (b x c)|, |(a x b) x c|
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