Consider a polynomial P(x) of the least degree that has a maximum equal to 6 at x=1 and a minimum equal to 2 at x=3. Then the value of p(2)+P(0)-7 is

If P(x) is a polynomial of the least degree that has a maximum equal to 6 at x=1 , and a minimum equal to 2 at x=3 , then int_(0)^(1)P(x)dx equals

If P(x) is a polynomial of the least degree that has a maximum equal to 6 at x=1, and a minimum equalto 2 at x=3, then int_(0)^(1)P(x)dx equals:

If P(x) is a polynomial of the least degree that has a maximum equal to 6 at x=1 , and a minimum equalto 2 at x= 3 ,then int_0^1 P(x)dx equals:

If P(x) is a polynomial of the least degree that has a maximum equal to 6 at x=1 , and a minimum equalto 2 at x= 3 ,then int_0^1 P(x)dx equals:

If P (x) be a polynomial of degree three that has a local maximum value 8 at x=1 and a local minimum value 4 at x=2 , then p (0 ) is equal to :

Let p(x) be a real polynomial of least degree which has a local maximum at x=1 and a local minimum at x=3. If p(1)=6 and p(3)=2, then p'(0) is

Let p(x) be a real polynomial of least degree which has a local maximum at x=1 and a local minimum at x=3. If p(1)=6a n dp(3)=2, then p^(prime)(0) is_____

Let p(x) be a real polynomial of least degree which has a local maximum at x=1 and a local minimum at x=3. If p(1)=6a n dp(3)=2, then p^(prime)(0) is_____