The area between the curves y = xex and y = xe-x and the line x = 1, in sq unit, is :
sq unit
0 sq unit
2e sq unit
sq unit
If the tangent to the graph function y = f(x) makes angles with the x-axis is at the point x = 2 and x = 4 respectively, the value of :
f(4) f(2)
f(4)
f(2)
1
The solution of 2(y + 3) - xy = 0 with y = - 2,when x = 1 is
(y + 3) = x2
x2(y + 3) = 1
x4(y + 3) = 1
x2(y + 3)3 = ey + 2
Let f : R R be a differentiable function and f(1) = 4. Then the value of , if f'(1) = 2 is :
16
8
4
2
The solution of represents a parabola, when :
a = 0, b = 0
a = 1, b = 2
a = 0, b 0
a = 2, b = 1
C.
a = 0, b 0
The given differential equation is
Thus, above equation represents a parabola, if