Question

If cos(x)cos(x-(Π/3))=1-(n/6), then the constraint of the value n that satisfies ?

Answer 1

`n in [ - 1/4, 7/4 ]`

Explanation:

`cos x cos ( x - pi/3 ) = cos x ( cosx cos (pi/3) + sin x sin (pi/3) )`

`= 1/2 ( cos^2x + sqrt3 sin x cos x )`

`= 1/2( 1/2(1 + cos 2x ) + 1/2sqrt 3 sin 2x )`

`= 1/4 + cos ( 2x - pi/3 )`

`= 1 -n/6`. So,

`cos ( 2x - pi/3 ) = 3/4 - n/6 in [ -1, 1 ]`

`rArr -n/6 in [ -1 - 3/4, 1 - 3/4 ] = [ - 7/4, 1/4 ]`

`n/6 in [ - 1/4, 7/4 ]`, and so,

`n in [ -3/2, 21/2 ]`