Find a quadratic equation whose product of roots `x_1a n dx_2` is equal to 4 an satisfying the relation `(x_1)/(x_1-1)+(x_2)/(x_2-1) =2.`

Find a quadratic equation whose product of roots x_1 a n d x_2 is equal to 4 and satisfying the relation (x_1)/(x_1-1)+(x_2)/(x_2-1)=2.

Find a quadratic equation whose product of roots x_1 a n d x_2 is equal to 4 and satisfying the relation (x_1)/(x_1-1)+(x_2)/(x_2-1)=2.

Find a quadratic equation whose product of roots x_1 and x_2 is equal to 4 and satisfying the relation (x_1)/(x_1-1)+(x_2)/(x_2-1)=2.

Find a quadratic equation whose product of roots x_1 and x_2 is equal to 4 and satisfying the relation (x_1)/(x_1-1)+(x_2)/(x_2-1) =2.

Find a quadratic equation whose product of roots x_1 and x_2 is equal to 4 and satisfying the relation (x_1)/(x_1-1)+(x_2)/(x_2-1) =2.

Find a quadratic equation whose product of roots x_1 and x_2 is equal to 4 an satisfying the relation (x_1)/(x_1-1)+(x_2)/(x_2-1)=2.

Find a quadratic equation whose product of roots x_(1) and x_(2) is equal to 4 an satisfying the relation (x_(1))/(x_(1)-1)+(x_(2))/(x_(2)-1)=2

Find a quadratic equation whose roots x_(1) and x_(2) satisfy the condition x_(1)^(2)+x_(2)^(2)=5,3(x_(1)^(5)+x_(2)^(5))=11(x_(1)^(3)+x_(2)^(3)) (assume that x_(1),x_(2) are real)

Find a quadratic equation whose roots x_(1) and x_(2) satisfy the condition x_(1)^(2)+x_(2)^(2)=5,3(x_(1)^(5)+x_(2)^(5))=11(x_(1)^(3)+x_(2)^(3)) (assume that x_(1),x_(2) are real)