Question

A quadratic polynomial whose zeroes are -3 and 4 ?
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Answer 1

$♕ \: \: \large{\rm{{\underline{\underline{\red{S}\purple{O}\pink{LU}\orange{TI}\green{ON}}}}}} \: \: ♕$

FORMULA TO BE IMPLEMENTED

A quadratic equation whose roots are are given

Then the equation is given by

${x}^{2} - (sum \: of \: the \: zeroes \: )x + (product \: of \: \: the \: zeroes) = 0$

TO DETERMINE

A quadratic polynomial whose zeroes are -3 and 4

CALCULATION

The quadratic equation is given by

${x}^{2} - (sum \: of \: the \: zeroes \: )x + (product \: of \: \: the \: zeroes) = 0$

$\implies \: {x}^{2} - ( - 3 + 4)x + ( - 3 \times 4) = 0$

$\therefore \: {x}^{2} - x - 12 = 0$

Answer 2

Answer:

quadratic polynomial is x^2+ x+ 12=0

is the required polynomial..

Step-by-step explanation:

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