Prove that In `(1 + x) lt "x for x" gt 0`

Prove that (1+x)^n ge1+n x , for all natural number 'n', where x gt-1 .

If x and y are positive real numbers , then prove that x lt y iff x^2 lt y^2

consider the system of inequalities x + 3 gt 0 , 2x lt 14 Prove that -4 le x , 5x gt -15

Given f'(1) = 1 and f(2x) = f(x) AA x gt 0 . If f'(x) is differentiable then prove that there exists a number c in (2, 4) such that f''(c) = - 1/8

Prove that tan ^(-1) x+tan ^(-1) ((2 x)/(1-x^2))=tan ^(-1)((3 x-x^3)/(1-3 x^2)),|x|lt1/sqrt3

The functions f(x) = tan ^(-1) (sin x +cos x ) , x gt 0 is always an increasing functions on the interval :

The set of values of x satisfying 2 le abs(x-3) lt 4 is : a) (-1, 1] cup [5, 7) b) -4 le x le 2 c) -1 lt x lt 7 or x ge 5 d) x lt 7 or x ge 5

Solve the following inequilities and represent the solution graphically on the real line. 2(x-1) lt x+5, 3(x+2) gt 2-x