Find the quadratic polynomial sum of whose is 2root3 and their product is 2
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Answer:
x(square)_(2√3)x+(2)=0 is the required quadratic polynomial.
Explanation:
if (a+b) is sum of roots and (ab) is product of roots then, equation of required quadratic polynomial is of the for [x(square)_(a+b)x+(ab)=0].
here given (a+b)=2√3 and (ab)=2.
so, the required equation is
[x(square)_(2√3)x+(2)=0.]
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So we can simply find this by putting in formula x^2 - (sumofzero)x + Product of zero or we can say x^2-Sx+P ... hope this helps u and use this trick . Pls mark as BRAINLIEST and THANK me ☺️☺️☺️☺️
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