Statement 1 : `f(x)=log_(e+x) (pi+x)` is strictly increasing for all .
Statement 2 : `pi+x gt e+x, AA x gt 0`

Show that f(x) = e^(1//x) is a strictly decreasing function for all x gt 0

Statement 1: The function x^(2)(e^(x)+e^(-x)) is increasing for all x>0 statement 2: The functions x^(2)e^(x) and x^(2)e^(-x) are increasing for all x>0 and the sum of two infunctions in any interval (a,b) is an increasing function in (a,b).

Prove that function f(x)=log_(e)x is strictly increasing in the interval (0,oo)

Prove that function f(x)=log_(e)x is strictly increasing in the interval (0,oo)

Prove that the function f(x)=log_(e)(x^(2)+1)-e^(-x)+1 is strictly increasing AA x in R.

Statement-1 : f(x) = log_(10)(log_(1/x)x) will not be defined for any value of x. and Statement -2 : log_(1//x)x = -1, AA x gt 0, x != 1

Statement l: f(x)=((log(pi+x))/(log(e+x)) is increasing on ((e)/(pi),(pi)/(e)) statement II: x log x is increasing for x>(1)/(e)

Statement 1: Let f(x)=sin(cos x) in [0,(pi)/(2)]* Then f(x) is decreasing in [0,(pi)/(2)] Statement 2:cos x is a decreasing function AA x in[0,(pi)/(2)]

Statement-1 : If x^("log"_(x) (3-x)^(2)) = 25, then x =-2 Statement-2: a^("log"_(a) x) = x,"if" a gt 0, x gt 0 " and " a ne 1

Prove that the function f given by f" "(x)" "=" "log" "cos" "x is strictly decreasing on (0,pi/2) and strictly increasing on (pi/2,pi) prove that the function f given by f(x) = log sin x is strictly decreasing on ( 0 , pi/2) and strictly increasing on ( pi/2 , pi) . .