Show that the distance between (1,1) and `((2m^(2))/(1+m^(2)) , ((1-m)^(2))/(1+m^(2)))` is independent of m.

Show that the distance between (1,-1) and ((2m^2)/(1+m^2),(1-m)^2/(1+m^2)) is not depend on m

Show that the distance between the points (1,1) and [(2m^(2))/(1+m^(2)),((1-m)^(2))/(1+m^(2))] is the same for all values of m .

Factorise : m^(2)+(1)/(m^(2))+2-2m-(2)/(m)

Using determinant : show that the area of the triangle whose vertices are (m,m-2),(m+2,m+2) and (m+3,m) , is independent of m .

sum_(m=1)^(n) tan^(-1) ((2m)/(m^(4) + m^(2) + 2)) is equal to

The normal to the parabola y^(2)=4ax at P(am_(1)^(2),2am_(1)) intersects it again at Q(am_(2)^(2), 2am_(2)) .If A be the vertex of the parabola then show that the area of the triangle APQ is (2a^(2))/(m_(1))(1+m_(1)^(2))(2+m_(1)^(2)) .

Find the value of m for which the area of the triangle having vertices at (-1,m) , (m-2,1) and (m-2,m) is 12(1)/(2) square units .

Let T_r a n dS_r be the rth term and sum up to rth term of a series, respectively. If for an odd number n ,S_n=na n dT_n=(T_n-1)/(n^2),t h e nT_m ( m being even)is 2/(1+m^2) b. (2m^2)/(1+m^2) c. ((m+1)^2)/(2+(m+1)^2) d. (2(m+1)^2)/(1+(m+1)^2)

Show that the integer next above (sqrt(3)+1)^(2m) contains 2^(m+1) as a factor.