If the equation `(1+m)x^(2)-2(1+3m)x+(1+8m)=0` where `m epsilonR~{-1}`, has atleast one root negative, then

For what values of m the equation (1+m)x^(2)-2(1+3m)x+(1+8m)=0 has (m in R) (i) both roots are imaginary? (ii) both roots are equal? (iii) both roots are real and distinct? (iv) both roots are positive? (v) both roots are negative? (vi) roots are opposite in sign? (vii)roots are equal in magnitude but opposite in sign? (viii) atleast one root is positive? (ix) atleast one root is negative? (x) roots are in the ratio 2:3 ?

Statement -1 The equation x^(2)+(2m+1)x+(2n+1)=0 where m,n epsilonI canot have any rational roots. Statement -2 The quantity (2m+1)^(2)-4(2n+1) , where m, n epsilonI can never be perfect square.

for what values of m, the equation 2x^(2) -2 ( 2m +1) x+ m ( m +1) = 0, m in R has (i) Both roots smallar than 2 ? (ii) Both roots greater than 2 ? (iii) Both roots lie in the interval (2,3) ? (iv) Exactly one root lie in the interval (2,3) ? (v) One root is smaller than 1, and the other root is greater than 1 ? (vi) One root is greater than 3 and the other root is smaller than 2 ? (vii) Roots alpha and beta are such that both 2 and 3 lie between alpha and beta ?

If m_(1) and m_(2) are the roots of the equation x^(2) + ( sqrt(3) + 2) x + sqrt(3) - 1 =0 then prove that area of the triangle formed by the lines y=m_(1) x, y=m_(2) x and y=c is (c^2)/( 4) ( sqrt(33) + sqrt(11)) .

If both roots of the equation x^(2)-(m-3)x+m=0(m in R) are positive, then

For what values of the parameter a the equation x^(4)+2ax^(3)+x^(2)+2ax+1=0 has atleast two distinct negative roots?

If 2a+3b+6c = 0, then show that the equation a x^2 + bx + c = 0 has atleast one real root between 0 to 1.

Find the roots of the equation (1)/(x)-(1)/(x-2)=3, x ne 0,2

Let x^2-(m-3)x+m=0 (m in R) be a quadratic equation . Find the values of m for which the roots are: (ix)one root is smaller than 2 & other root is greater than 2 (x) both the roots are greater than 2. (xi) both the roots are smaller than 2. (xii) exactly one root lies in the interval (1,2) (xiii) both the roots lies in the interval (1,2) (xiv) at least one root lies in the interval (1,2) (xv) one root is greater than 2 and the other root is smaller than 1

The equation (2x^(2))/(x-1)-(2x +7)/(3) +(4-6x)/(x-1) +1=0 has the roots-