Consider `f(x)=x^2-3x+2` The area bounded by `|y|=|f(|x|)|,xge1` is A, then find the value of `3A+2`.

The area bounded by y = 2-|2-x| and y=3/|x| is:

If f (x) = |x|+|x-1|, find the value of : f(1/3) .

If f (x) = |x|+|x-1|, find the value of : f(-1/3) .

If f (x) = |x|+|x-1|, find the value of : f(2).

(i) Find the area bounded by y=2x+3, the x-axis and the ordinates x=-2 and x=2.

The area bounded by the curve y=3/|x| and y+|2-x|=2 is

Find the continuous function f where (x^4-4x^2)lt=f(x)lt=(2x^2-x^3) such that the area bounded by y=f(x),y=x^4-4x^2dot then y-axis, and the line x=t , where (0lt=tlt=2) is k times the area bounded by y=f(x),y=2x^2-x^3 ,y-axis , and line x=t(w h e r e0lt=tlt=2)dot

Let f(x)= minimum {e^(x),3//2,1+e^(-x)},0lexle1 . Find the area bounded by y=f(x) , X-axis and the line x=1.

Let f(x) be a real valued function satisfying the relation f(x/y) = f(x) - f(y) and lim_(x rarr 0) f(1+x)/x = 3. The area bounded by the curve y = f(x), y-axis and the line y = 3 is equal to

f(x)=(x-1)/(x^(2)-2x+3) Find the range of f(x).