SOLUTION: Find real numbers a, b, and c such that the graph of the function ax^2 + bx + c contains the points (1,1), (2,4), and (-3,29).

Algebra ->  Matrices-and-determiminant -> SOLUTION: Find real numbers a, b, and c such that the graph of the function ax^2 + bx + c contains the points (1,1), (2,4), and (-3,29).      Log On


   

Question 62816: Find real numbers a, b, and c such that the graph of the function ax^2 + bx + c contains the points (1,1), (2,4), and (-3,29).
Answer by venugopalramana(3286) About Me  (Show Source):
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SEE THE FOLLOWING EXAMPLE AND TRY.IF STILL IN DIFFICULTY PLEASE COME BACK
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Find an equation of the form y = ax^2 + bx + c whose graph passes through the points (1,-2) (2,-1), and (3,4).
SUBSTITUTING THE VALUE OF X FROM POINTS(X,Y) IN THE GIVEN EQN. FOR Y WE GET
A+B+C=-2...................1
4A+2B+C=-1.......................2
9A+3B+C=4............3
EQN.2-EQN.1
3A+B=1................4
EQN.3-EQN.2
5A+B=5.................5
EQN.5 - EQN.4
2A=4
A=2
SUBSTITUTING IN EQN.4....
6+B=1
B=-5
SUBSTITUTING IN EQN.1
2-5+C=-2
C=1
HENCE THE EQN.IS
Y = 2X^2-5X+1