Home
Class 12
MATHS
Statement I Common value(s) of 'x' satis...

Statement I Common value(s) of 'x' satisfying the equation . ` log_(sinx )( sec x +8) gt o and log_(sinx) cos x + log_(cos x ) sin x =2 `in `(0, 4pi)` does not exist.
Statement II On solving above trigonometric equations we have to take intersection of trigonometric chains given by ` sec x gt 1 and x = n pi +(pi)/(4), n in I `

A

Statement I is true , Statement II is true , Statement II is a correct explanation for Statement I.

B

Statement I is true , Statement II is true , Statement II is not a correct explanation for Statement II.

C

Statement I is true , Statement II is false

D

Statement I is false , Statement II true .

Text Solution

Verified by Experts

The correct Answer is:
C
Promotional Banner

Similar Questions

Explore conceptually related problems

The possible value(s) of x, satisfying the equation log_(2)(x^(2)-x)log_(2) ((x-1)/(x)) + (log_(2)x)^(2) = 4 , is (are)

Number of real values of x satisfying the equation log_(x^2+6x+8)(log_(2x^2+2x+3)(x^2-2x))=0 is equal to

Solve the equation x^(log_(x)(x+3)^(2))=16 .

The number of values of y in [-2pi,2pi] satisfying the equation abs(sin2x)+abs(cos2x)=abs(siny) is

Solve the equation log_((log_(5)x))5=2

The number of solutions of log_(cosecx) sin x gt 0 , in (0,90^(@)) is -

If sec x cos 5x=-1 and 0 lt x lt (pi)/(4) , then x is equal to

cos(2pi -x) cos (-x) - sin(2pi +x) sin (-x) = 0

If 0 le x le 2pi , then the number of real values of x, which satisfy the equation cos x + cos 2x + cos 3x + cos 4x=0 , is