#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

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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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#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|

#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|

#Product_Of_Vectors If a=i-2j-3k, b=2i+j-k, c=i+3j-2k ThenShowThat ax(bxc) = (axb)xc

If a=2i+j+3k and b=3i+5j-2k then find |axb||Vector algebra|class 12|CBSE|BOARD|NCERT|Term 2

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Dot Product of the Vectors u = 3i + 2j + 4k and v = -i + j

VECTORS\PROVE THAT THE GIVEN VECTORS i-2j+3k, -2i+3j-4k, i-3j+5k ARE COPLANAR VECTORS

A=2i-3j-k and B=i+4j-2k. Find AXB

If the vectors 2i-3j+4K 2i+j-k and xi-j+2k are coplanar then the value of Lambda is

CLASS 12 VECTORS ( PART 3 ) : DOT OR SCALAR PRODUCT ( JEE / JEE ADV / NDA )

27) If a=7i-2j+3k,b=2i+8k and c=i+j+k,then compute ā×b,ā×c and a x (b+c).

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#ProductOfVectors If a = 6i + 2j + 3k, b = 2i - 9j + 6k then find Angle between a and b

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If the three vectors 2𝑖−𝑗+𝑘,𝑖+2𝑗−3𝑘 and 3𝑖+𝜆𝑗+5𝑘 are coplanar, then λ is...

2. Find the cross product of A=-2i+3j-4k and B = 3i-4j+5k. Class XI Physics; #Crossproduct

Magnitude of the Vector v = -2i + 3j + 4k

Find the unit vector perpendicular to each of the vectors a=4i+3j+k and|Vector algebra|12|CBSE|BOARD

If a = i + 2j + 3k & b = 3i - j + 2k be two vectors then show that (a+b) & (a-b) are perpend...

If A=(2i+3j-k)m and B=(i+2j+2k)m.The magnitude of component of vector A along vector B will be _ m.

Easily explained two vectors are perpendicular to each other GOOD example (PART-7)

Find the scalar and vector products of two vectors, a = (3i-4j+5k) and b=(-2i+j‐3k)

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XII Vectors If vector a = 3i - j and b = 2i + j - 3k, then express b in the form b = b1 + b2 , whe