Final answer:
The values of A and B for the quadratic equation y = x² + Ax + B that passes through (1,9) and (-3,25) are A = 2 and B = 6.
Step-by-step explanation:
To find values of A and B for the quadratic equation y = x² + Ax + B that goes through the points (1,9) and (-3,25), we can substitute these points into the equation and solve for A and B.
- For the point (1, 9):
9 = 1^2 + A(1) + B
9 = 1 + A + B - For the point (-3, 25):
25 = (-3)^2 + A(-3) + B
25 = 9 - 3A + B
To find A and B, we need to solve these equations simultaneously.
- From the first equation, we get:
B = 9 - A - 1
B = 8 - A - Substituting B into the second equation:
25 = 9 - 3A + (8 - A)
25 = 17 - 4A
A = (17 - 25)/-4
A = 2 - Now, substituting A back into the equation for B:
B = 8 - 2
B = 6
Therefore, the values are A = 2 and B = 6.