Choose the odd one out (1) Major axis paralle to x-axis
(2) ` c^(2)= a^(2) -b^(2)`
(3) forward c units right and c units left of centre
(4) ` c^(2) = a^(2) + b^(2) `

Choose the odd one out (1) y^(2) = 4ax (2) c= a/m (3) c^(2) = a^(2(1+m^(2))) (4) (a/m^(2) , (2a)/m)

Choose the odd one out (1) Transverse axis is parallel to x-axis (2) Directrix are x = -+ a/e (3) Cenre is (0,0) (4) Transvervse axis parallel to y-axis

If a^(2)+b^(2)+c^(2)=1 where, a,b, cin R , then the maximum value of (4a-3b)^(2) + (5b-4c)^(2)+(3c-5a)^(2) is

If b_(1)b_(2) = 2(c_(1) + c_(2)) , then at least one of the equations x^(2) + b_(1)x + c_(1) = 0 and x^(2) + b_(2)x + c_(2) = 0 has

AB is a chord of x^2 + y^2 = 4 and P(1, 1) trisects AB. Then the length of the chord AB is (a) 1.5 units (c) 2.5 units (b) 2 units (d) 3 units

IF in triangle ABC a cos ^2 ((C )/(2 )) c cos ^2 ((A) /(2 )) = (3 b)/(2) then the sides a,b,and c

If a x^(2)+b x+c=0 and b x^(2)+c x+a=0, a, b, c ne 0 have a common root, then value of ((a^(3)+b^(3)+c^(3))/(a b c))^(2) is

Without expanding the determinant, prove that {:[( a, a ^(2), bc ),( b ,b ^(2) , ca),( c, c ^(2) , ab ) ]:} ={:[( 1, a^(2) , a^(3) ),( 1,b^(2) , b^(3) ),( 1, c^(2),c^(3)) ]:}

Two circles C_1 and C_2 intersect in such a way that their common chord is of maximum length. The center of C_1 is (1, 2) and its radius is 3 units. The radius of C_2 is 5 units. If the slope of the common chord is 3/4, then find the center of C_2dot

If a ,b ,c are non zero (a b c^2)x^2+3a^2c x+b^2c x-6a^2-a b+2b^2=0 are rational.