Statement I `sin x=a , ` where `-1 lt a lt 0 `, then for ` x in [0,npi]` has `2(n-1) ` solution ` AA n in N` .
Statement II sin x takes value a exactly two times when we take one complete rotation covering all the quadrants starting from x=0 .

If sec x cos 5x+1=0 , where 0lt x lt 2pi , then x=

Statement I The number of solution of the equation |sin x|=|x| is only one. Statement II |sin x| ge 0 AA x in R .

If f(x)=(a-x^(n))^(1/n) , where a gt 0 and n in N , then fof (x) is equal to

Statement I y=asin x+bcos x is general solution of y''+y=0. Statement II y=a sin x+b cos x is a trigonometic function.

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

State True or False, if 'false' write correct statement. The point (-x,-y) lies in the first quadrant where x lt 0, y lt 0 .

Statement 1 is True: Statement 2 is True; Statement 2 is a correct explanation for statement 1 Statement 1 is true, Statement 2 is true 2 Statement 2 not a correct explanation for statement 1. Statement 1 is true, statement 2 is false Statement 1 is false, statement 2 is true Statement I: If a ,\ \ b , c in R\ a n d a!=b!=c\ a n d\ x ,\ y ,\ z are non zero. Then the system of equations a x+b y+c z=0,b x+c y+a z=0,c x+a y+b z=0 has infinite solutions. because Statement II: If the homogeneous system of equations has non trivial solution, then it has infinitely many solutions. a. A b. \ B c. \ C d. D

Statement I x =(kpi)/(13), k in I does not represent the general solution of trigonometric equation. sin 13 x - sin 13 x cos 2x=0 Statement II Both x=r pi , r in I and x=(k pi )/(13) , k in I satisfies the trigonometric equation. sin 13 x - sin 13 x cos 2x =0

If 2tan^2x-5secx=1 for exactly seven distinct value of x in [0,(npi)/2],n in N then find the greatest value of ndot

Cosider the equation int_(0)^(x) (t^(2)-8t+13)dt= x sin (a//x) If x takes the values for which the equation has a solution, then the number of values of a in [0, 100] is