Let vecx, vecy and vecz be three vectors each of magnitude √2 and the angle between each pair of them is (π/3). If veca is a non-zero vector perpendicular to vecx and vecy × z and vecb is a non-zero vector perpendicular to vecy and vecz × vecx, then

Question

Let vecx, vecy and vecz be three vectors each of magnitude √2 and the angle between each pair of them is (π/3). If veca is a non-zero vector perpendicular to vecx and vecy × z and vecb is a non-zero vector perpendicular to vecy and vecz × vecx, then (A)  vecb=( vecb ⋅ vecz)( vecz- vecx) (B)  veca=( veca ⋅ vecy)( vecy- vecz) (C)  veca ⋅ vecb=-( veca ⋅ vecy)( vecb ⋅ vecz) (D)  veca=( veca ⋅ vecy)( vecz- vecy)

Tardigrade Admin · Accepted Answer

veca is in direction of vecx ×( vecy × vecz) i.e. ( barx ⋅ barz) vecy-( barx ⋅ vecy) barz ⇒ veca=λ1[2 × (1/2)( bary- barz)] veca=λ1( vecy- vecz) ldots (1) Now vec a ⋅ vec y =λ1( vec y ⋅ vec y - vec y ⋅ vec z ) =λ1(2-1) ⇒ λ1= vec a ⋅ vec y ldots(2) From (1) and (2), vec a = vec a ⋅ vec y ( vec y - vec z ) Similarly, vec b =( vec b ⋅ vec z )( vec z - vec x ) Now, vec a ⋅ vec b =( vec a ⋅ vec y )( vec b ⋅ vec z )[( vec y - vec z ) ⋅( vec z - vec x )] =( veca ⋅ vecy)( vecb ⋅ barz)[1-1-2+1] =-( veca ⋅ vecy)( vecb ⋅ vecz)

Q. Let $x, y$ and $z$ be three vectors each of magnitude $2$ and the angle between each pair of them is $\frac{π}{3}$ . If $a$ is a non-zero vector perpendicular to $x$ and $y \times z$ and $b$ is a non-zero vector perpendicular to $y$ and $z \times x$ , then

$b = (b \cdot z) (z - x)$

$a = (a \cdot y) (y - z)$

$a \cdot b = - (a \cdot y) (b \cdot z)$

$a = (a \cdot y) (z - y)$

Q. Let x,y​ and z be three vectors each of magnitude 2​ and the angle between each pair of them is 3π​. If a is a non-zero vector perpendicular to x and y​×z and b is a non-zero vector perpendicular to y​ and z×x, then

b=(b⋅z)(z−x)

a=(a⋅y​)(y​−z)

a⋅b=−(a⋅y​)(b⋅z)

a=(a⋅y​)(z−y​)

Q. Let $x, y$ and $z$ be three vectors each of magnitude $2$ and the angle between each pair of them is $\frac{π}{3}$ . If $a$ is a non-zero vector perpendicular to $x$ and $y \times z$ and $b$ is a non-zero vector perpendicular to $y$ and $z \times x$ , then

$b = (b \cdot z) (z - x)$

$a = (a \cdot y) (y - z)$

$a \cdot b = - (a \cdot y) (b \cdot z)$

$a = (a \cdot y) (z - y)$