The value of `lambda` such that sum of the squares of the roots of the quadratic equation, `x^2+(3-lambda)x+2=lambda` has the least value is

The value of lamda such that sum of the squares of the roots of the quadratic equation, x^(2)+(3-lamda)x+2=lamda had the least value is

The value of lamda such that sum of the squares of the roots of the quadratic equation, x^(2)+(3-lamda)x+2=lamda had the least value is

The values of lambda such that sum of the squares of the roots of the quadratic equation x^(2) + (3 - lambda) x + 2 = lambda has the least value is

The values of lambda such that sum of the squares of the roots of the quadratic equation x^(2) + (3 - lambda) x + 2 = lambda has the least value is

The values of lambda such that sum of the squares of the roots of the quadratic equation x^(2) + (3 - lambda) x + 2 = lambda has the least value is

The value of lambda for which the sum of squares of roots of the equation x^2+(3-lambda)x+2=lambda is minimum, then lambda is equal to (a) 2 (b) -1 (c) -3 (d) -2

The value of lambda for which the sum of squares of roots of the equation x^(2)+(3-lambda)x+2=lambda is minimum,then lambda is equal to (a) 2 (b) -1 (c) -3(d)-2

If lambda in R is such that the sum of the cubes of the roots of the equation x^(2)+(2-lambda)x+(10-lambda)=0 is minimum then the magnitude of the difference of the roots of this equation is :

Minimum possible number of positive root of the quadratic equation x^2 -(1 +lambda)x+ lambda -2 =0 , lambda in R

Minimum possible number of positive root of the quadratic equation x^(2)-(1+lambda)x+lambda-2=0,lambda in R