Razizi said:
Lol Namu. I'll post the questions up instead, making life easier
:
1. Express x^3+2x^2-3x+1 as a polynomial in (x+1)
2. If the polynomials 2x^2+4x+4 and a(x+1)^2+b(x+2)^2+c(x+3)^2 are equal for three values of x, find a, b and c.
3. A polynomial of degree 3 has a double zero at 2. When x = 1 it takes the value 6 and when x = 3 it takes the value 8. Find the polynomial.
4. Two zeroes of a polynomial of degree 3 are 1 and -3. When x = 2 it takes the value -15 and when x = -1 it takes the value 36. Find the polynomial.
Thanks.
1. As tommykins said, only way to work this out is to substitute x+1 and manipulate your way. I got it in the end. It's not an easy question.
2. In this question, you substitute -1, -2 and -3 into the two equations separately. For example:
Let x = -1, then
2x^2 + 4x + 4 = 2 and
a(x+1)^2 + b(x+2)^2 + c(x+3)^2 = b + 4c.
Then you will find that 2 = b + 4c because they are both equal.
Let x = -2, then a + c = 4 and let x = -3, then b + 4a = 10
So you have three equations:
1) b + 4c = 2
2) a + c = 4
3) b + 4a = 10
Manipulating equation 3), you get b = 10 - 4a ...(4)
Substitute this to the equation (1) and you get:
10 - 4a + 4c = 2
-4a + 4c = - 8
a - c = 2 ...(5)
Using the elimination method, compare this with equation (2). Then
you find the value of c which is 1. c = 1
Substitute the value of c to get a. a = 3.
Then the value of b can be found. b = - 2
3. P(x) = (x-2)^2 . (x-a)
P(1) = (1-2)^2 . (1-a)
= 1 - a which is equal to 6
1-a = 6, so a = -5
Therefore, P(x) = (x-2)^2 . (x+5)
