The least natural number 'n' for which `(n-2)x^2+8x+n+4>sin^(-1)(sin12)+cos^(-1)(cos12) AA x in R` is

Find the number of integer(s) in the range of f(x)=sin^(-1)(sin x)+cos^(-1)(cos x)AA x in R

Let n be the smallest natural number for which the limit lim_(x rarr0)(sin^(n)x)/(cos^(2)x(1-cos x)^(3)) exists,then tan ^(-1)(tan n) is equal to

sin(n+1)xsin(n+2)x+cos(n+1)xcos(n+2)x=cosx

The least value of n in N for which (n - 4)x^(2) + 8x + n + 2 gt 0 AA x in R , is

sin (n + 1) A sin (n-1) A + cos (n + 1) A cos (n-1) A = cos2A

For x ^ 2 ne n pi + 1, n in N ( the set of natural numbers ), the integral int x sqrt ((2 sin (x ^ 2 - 1 ) - sin 2 (x ^ 2 - 1 ))/(2 sin ( x ^ 2 - 1 ) + sin2 (x ^ 2 - 1 ) )) dx is

Find the least value of n such that (n-2)x^(2)+8x+n+4>0,AA x in R, wheren in N

sin (n + 1) A * sin (n-1) A + cos (n + 1) A * cos (n-1) A = cos2A

Solve the equation sin^(2n-1)x+2cos^(2n-1)x=2 ,where n in N .