For `x >1, y=logx-(x-1)` satisfies the inequality

For x>1,y=log x satisfy the inequality

The minimum value of x which satisfies the inequality (sin^(-1)x)^(2)ge(cos^(-1)x)^(2) is

The minimum value of x which satisfies the inequality (sin^(-1)x)^(2)ge(cos^(-1)x)^(2) is

y le 3x+1 x-y gt 1 Which of the following ordered pairs (x,y) satisfies the system of inequalities above?

The function y=2x^2-log(x) is monotonically increasing for values of x(!=0) satisfying the inequalities____ and monotonically decreasing for values of x satisfying the inequalities_____.

The function y=2x^2-log(x) is monotonically increasing for values of x(!=0) satisfying the inequalities____ and monotonically decreasing for values of x satisfying the inequalities_____.

The function y=2x^2-ln|x| is monotonically increasing for values of x(!=0) satisfying the inequalities____ and monotonically decreasing for values of x satisfying the inequalities_____.

The function y=2x^(2)-ln|x| is monotonically increasing for values of x(!=0) satisfying the inequalities monotonically decreasing for values of x satisfying the inequalities

All the pairs (x, y) that satisfy the inequality 2 ^(sqrt(sin^(2) x - 2 sin x + 5) ) . (1)/(4 ^(sin^(2) y)) le 1 also satisfy the equation :