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

If the equation z^(3)+(3+i)z^(2)-3z-(m+i)=0, " where " i=sqrt(-1) " and " m in R , has atleast one real root, value of m is

Find the value of x of the equation x^2+m-8=0 where m=3

The equation e^x = m(m +1), m<0 has

Find the value of x of the equation x+2m-9=0 where m=4

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

Solve The equation Statement -1 x^(2)+(2m+1)x+(2n+1)=0 where m and n are integers, cannot have any rational roots. Statement - 2 The quantity (2m+1)^2 −4(2n+1) , where m,n∈I, can never be a perfect square.

If equations ax^(2)+bx+c=0 (where a,b,c epsilonR and a!=0 ) and x^(2)+2x+3=0 have a common root, then show that a:b:c=1:2:3

If the equation : (a +1) x^2 -(a+2)x+(a+3)=0 has roots equal in magnitude but Opposite in signs, then the roots of the equation are:

Find the value of x of the equation x+m-7=0 where m=3