The equation of the plane which is at a distance of `2sqrt(3)` units from the origin and whose normal has the d.c's `((1)/(sqrt(3)),(-1)/(sqrt(3)),(1)/(sqrt(3)))` is

Find the equation of the plane which is at a distance of 5sqrt(14) from the origin and whose normal has d.r.s (2, -1, 3) .

sin^(-1)((sqrt(3))/2)-tan^(-1)(-sqrt(3))=

Simplify (1)/(7+4sqrt(3))+(1)/(2+sqrt(5))

(d)/(dx) {(1)/(sqrt(3x +2))}=

tan^(-1)sqrt(3)-cot^(-1)(-sqrt(3)) is equal to

The equation of the plane in cartesian form, which is at a distance of (6)/(sqrt(29)) from the origin and its normal vector drawn from the origin being 2 hat(i)-3hat(j)+4hat(k) , is

Find the value of cos^(-1)sqrt(2/3)-cos^(-1)""(sqrt(6)+1)/(2sqrt(3))