Let a vector `a hati + beta hatj ` be obtained by rotating the vector `sqrt3 hati + hatj` by an angle `45^(@)` about the origin in counterclockwise direction in the first quadrant. Then the area of triangle having vertices `(alpha, beta) , (0, beta) and (0,0)` is equal to:

For p gt 0 vector vecv _(2) = 2 hati + (p + 1 ) hatj is obtained by rotating the vector vec v _(1) = sqrt3 p hati + hatj by an angle theta about origin in counter clockwise direction. If tan theta = (( alpha sqrt3 - 2)/( 4 sqrt3 + 3)), then the value of alpha is equal to _____________

A vector hati+sqrt(3)hatj rotates about its tail through an angle 60^(@) in clockwise direction then the new vector is

alpha hati + beta hatj is obtained by rotating sqrt3hati+hatj by 45^@ in counter direction about only 45^@ . Find area of Delta made by (0,0), (0,beta)and (alpha , beta)

Find a unit vector in XY plane which makes an angle 45^(@) with the vector hati + hatj at angle of 60^(@) with the vector 3 hati - 4 hatj.

Let a=hati - hatj, b=hati + hatj + hatk and c be a vector such that a xx c + b=0 and a.c =4, then |c|^(2) is equal to .

If the vectors (hati+ hatj + hatk) and 3 hati from two sides of a triangle, then area of triangle is :