If a, b, y are the zeroes of a cubic polynomial then write a general cubic polynomial. Also, name the given terms according to the zeroes.
Answers
Answer:
For the given equation, ax
For the given equation, ax 3
For the given equation, ax 3 +bx
For the given equation, ax 3 +bx 2
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax 2
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax 2 +bx+c
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax 2 +bx+cProduct of the other roots =
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax 2 +bx+cProduct of the other roots = a
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax 2 +bx+cProduct of the other roots = ac
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax 2 +bx+cProduct of the other roots = ac
For the given equation, ax 3 +bx 2 +cx+d, 0 is the root of this equation implies d=0Hence, the equation is x(ax 2 +bx+c)The other two roots will be from ax 2 +bx+cProduct of the other roots = ac
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