(v)f(t)=t^(2)-1;t=1,-1

For all t gt 0 , f(x) = (t^(2)-1)/(t-1)-t . Which of the following is true about f(t) ?

Iff(y)=e^(y),g(y)>0, and F(t)=int_(0)^(t)t(t-y)dt, then F(t)=e^(t)-(1+t)F(t)=te^(t)F(t)=te^(-1)(d)F(t)=1-e^(t)(1+t)

Let f(t)=(t^(2)-1)/(t+3) find f'(1) :

If f(t) = 1/(t^(2)-t-6) and t = 1/(x-2) then the values of x which make the function f discontinuous are

Find all point of discountinuity of the function f(t) = (1)/(t^(2)+t-2) , where t = (1)/(x-1) .

Find all point of discontinuity of the function f(t)=(1)/(t^(2)+t-2), where t=(1)/(x-1)

Find all point of discountinuity of the function f(t) = (1)/(t^(2)+t-2) , where t = (1)/(x-1) .

If int_(0)^(x)f(t)dt=x^(2)+int_(x)^(1)t^(2)f(t)dt, then f'((1)/(2)) is

The intervals of increase of f(x) defined by f(x)=int_(-1)^(x)(t^(2)+2t)(t^(2)-1)dt is equal to