A quadractic polynomial whose one zeroes is 5 and product of zeroes is 0 is .(Read x^2 as ....x square)
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x^2 - 5x + 0
Step-by-step explanation:
product of zeroes = alpha×beta
Now if product of zeroes is 0 then one of the is having value 0
Value of one zero is given of quadratic polynomial i.e., 5
Therefore, one zero is 0 and other is 5.
Hence quadratic polynomial is k(x^2-Sx+P)
k(x^2-5x+0)
NOTE : Here S is sum of zeroes (alpha + beta i.e., 5+0 = 5) and P is product of zeroes (alpha× beta i.e., 5×0 = 5)
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