Question

find a quadratic equation whose roots are root 3 and 3 root 3​

Answer 1

Answer:

sum of roots =$\sqrt{3}+3\sqrt{3}$=$4\sqrt{3}$

product of roots=$\sqrt{3}*3\sqrt{3}=9$

quadratic equation is given by x^2-(sum of roots)x+product of roots=0

so, requis=red quadratic equation is x^2-$4\sqrt{3}$x+9=0

Step-by-step explanation:

Answer 2

Answer:

hey frnd here is your answer

Step-by-step explanation:

You have given roots √3 and 3√3 .

so Sum of Roots = 3√3+√3=4√3.

Product of roots = (3√3)(√3)=9.

Quadratic equation in terms of Sum and product of Roots is X²-(sum of roots)x+ Product of roots.

so now we can write equation as X²-4√3x+9.

So frnd your final answer is X²-4√3+9.

I hope you get your answer

thank for asking

plzz mark as brainlist..