Answer:
A curve is given by y=(x-a)√(x-b) for x≥b. The gradient of the curve at A is 1.
Solution:
We need to show that the gradient of the curve at A is 1
Here given that ,
[tex]y=(x-a) \sqrt{(x-b)}[/tex] --- equation 1
Also, according to question at point A (b+1,0)
So curve at point A will, put the value of x and y
[tex]0=(b+1-a) \sqrt{(b+1-b)}[/tex]
0=b+1-c --- equation 2
According to multiple rule of Differentiation,
[tex]y^{\prime}=u^{\prime} y+y^{\prime} u[/tex]
so, we get
[tex]{u}^{\prime}=1[/tex]
[tex]v^{\prime}=\frac{1}{2} \sqrt{(x-b)}[/tex]
[tex]y^{\prime}=1 \times \sqrt{(x-b)}+(x-a) \times \frac{1}{2} \sqrt{(x-b)}[/tex]
By putting value of point A and putting value of eq 2 we get
[tex]y^{\prime}=\sqrt{(b+1-b)}+(b+1-a) \times \frac{1}{2} \sqrt{(b+1-b)}[/tex]
[tex]y^{\prime}=\frac{d y}{d x}=1[/tex]
Hence proved that the gradient of the curve at A is 1.
