Let p(x) be a polynomial of degree 5 having extremum at x=-1,1 and `lim_(x rarr0)((P(x))/(x^(3))-1)=7` .The value of |P(2)| is

Consider P(x) to be a polynomial of degree 5 having extremum at x=-1,1, and lim_(x rarr0)((p(x))/(x^(3))-2)=4. Then the value of [P(1)] is (where [.] represents greatest integer function)

Let p(x) be a polynomial of degree 4 having extremum at x=1,2 and lim_(x rarr0)(1+(p(x))/(x^(2)))=2. Then find the value of p(2)

Let P(x) be a polynomial of degree 5 having extremum at x= -1 , 1 and underset(x rarr 0)(lim) ((P (x))/(x^(3)) -1)= 7 . The value of |P(7)| is

lim_(x rarr0)(2^(5x)-1)/(x)

lim_(x rarr0)(2^(2x)-1)/(x)

lim_(x rarr0)(b^(x)-1)/(a^(x)-1)

lim_(x rarr0)(2^(x)-1)/(x)

lim_(x rarr0)(x^(2)-1)/(x^(2))

lim_(x rarr0)((e^(x)-x-1)/(x))

lim_(x rarr0)(x)/(sqrt(1+x))-1