Solve the linear equations. `m - (m- 1)/2 = 1 - (m - 2)/3`

Solve The equation x^(2)+(2m+1)x+(2n+1)=0

If the lines whose equations are y=m_1 x+ c_1 , y = m_2 x + c_2 and y=m_3 x + c_3 meet in a point, then prove that : m_1 (c_2 - c_3) + m_2 (c_3 - c_1) + m_3 (c_1 - c_2) =0

Solve the following equations and verify the results. m/5+m/2-4=(m)/3+7

If the loss in graviational potential energy to falling the sphere by h height and heat loss to surrounding at constant rate H are also taken to account the energy equation will modify to (A) m_(1) s_(1) (theta_(1)-theta) + (m_(1)gh)/(J) = m_(2) s_(2) (theta - theta_(2)) + m_(3) s_(3) (theta - theta_(2)) - H t (B) m_(1)s_(1) (theta_(1) -theta) - (m_(1)gh)/(J) = m_(2)s_(2)(theta -theta_(2)) + m_(3) s_(3) (theta -theta_(2)) + Ht (C) m_(1)s_(1) (theta_(1) -theta) + (m_(1)gh)/(J) = m_(2) s_(2) (theta - theta_(2)) + m_(3) s_(3) (theta -theta_(2)) + Ht (D) m_(1) s_(1) (theta_(1)-theta)-(m_(1)gh)/(J)=m_(2)s_(2)(theta-theta_(2)) +m_(3)s_(3)(theta-theta_(2))-Ht .

Solve the following system of equations by method of cross-multiplication: m x-n y=m^2+n^2,\ \ \ \ x+y=2m

If m is chosen in the quadratic equation (m^(2)+1)x^(2)-3x+(m^(2)+1)^(2)=0 such that the sum of its roots is greatest, then the absolute difference of the cubes of its roots is

Determine the values of m and n so that the following system of linear equations have infinite number of solutions: (2m-1)x+3y-5=0 . 3x+(n-1)y-2=0

The number of integral values of m for which the equation (1+m^(2)) x^(2) - 2(1+3m)x+(1+8m) = 0 , has no real roots is

Consider the equation (x^2 + x + 1)^2-(m-3)(x^2 + x + 1) +m=0--(1), where m is a real parameter. By putting x^2+x+1=t--(2) then t >= 3/4 for real x the equation can be transferred to f(t) = t^2- (m-3)t + m=0 . At what values of m for which the equation (1) will have real roots?

The number of positive integral values of m , m le 16 for which the equation (x^(2) +x+1) ^(2) - (m-3)(x^(2) +x+1) +m=0, has 4 distinct real root is: