Show that `f (x)= x^2` is strictly decreasing in `(-oo,0)`

Show that f(x)=e^(1//x) is a strictly decreasing function for all x in R .

Which one of the following is true? For the function f(x)= cos x f is strictly decreasing in (pi, 2pi)

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

Which one of the following is true? For the function f(x)= cos x f is strictly increasing in (pi, 2pi)

Answer the following questions: Write the interval in which the function f(x)=cos x is strictly decresing.

Is the function f(x) = cos x strictly increasing in (0, pi) ?

Show that the function given by f(x) = e^(2x) is strictly increasing on R.

Is the function f(x) = 5x - 4 strictly increasing on R ?

Show that the function given by f(x)=4x+18 is strictly increasing on R.