The area between `x=y^2 ` and `x=4` is divided into two equal by the line ` x=a` find the value of a.

The area between the curve y= x^2 , X- axis and x=4 is divided into two equal parts by the line x=a . The value of a is

The area between the parabolas y^2 = 4x and x^2 =4y divide the square formed by the lines x=4 , y=4 and oxes into three parts . If the area of these three parts from uppar to bottom is S_1 ,s_2 and S_3 then S_1 : S_2 :s_3 =..........

If the lines y=3x + 1 and 2y = x +3 are equally inclined to the line y= mx +4 , find the value of m.

Find the area between the curves y = x and y = x^(2) .

If the intercept of a line between the coordinate axes is divided by the point (-5, 4) in the ratio 1:2 , then find the equation of the line. Thinking Process : Coordinates of the point which divides line segment joining (x_1 , y_1 ) and ( x_2, y_2) in ratio (m_1 : m_2) ((m_1 x_2 + m_2 x_1)/( m_1 + m_2) , ( m_1 y_2 + m_2 y_1)/( m_1 + m_2)) .

Prove that the curves y^2 = 4x and x^2 = 4y divide the area of the square bounded by x=0, x=4 y=4 and y=0 into three equal parts .

Find the area of the region bounded by the curve y^2 =x and the lines x=1 , x=4 and the X- axis in the first quadrant .

Draw the graphs of the equations x = 3, x = 5 and 2x - y - 4 = 0 . Also find the area of the quadrilateral formed by the lines and the x-axis.