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Question: Let C be a curve \(y(x) = 1 + \sqrt {4x - 3} \), \(x > \dfrac{3}{4}\). If P is a point on C such tha...

Let C be a curve y(x)=1+4x3y(x) = 1 + \sqrt {4x - 3} , x>34x > \dfrac{3}{4}. If P is a point on C such that the tangent at P has slope 23\dfrac{2}{3}, then a point through which the normal at P passes is:
a)(1,7) b)(3,4) c)(4,3) d)(2,3)  a) \,(1,7) \\\ b) \,(3, - 4) \\\ c) \,(4, - 3) \\\ d) \,(2,3) \\\

Explanation

Solution

Slope of tangent of any equation in term of y=f(x)y = f(x) is given by dydx\dfrac{{dy}}{{dx}} and if m1{m_1} is the slope of tangent and m2{m_2} is the slope of normal then their product will be equal to 1 - 1 i.e. m1×m2=1{m_1} \times {m_2} = - 1.

Complete step-by-step answer:
So here a curve is given by equation y(x)=1+4x3,x>34y(x) = 1 + \sqrt {4x - 3} ,\,x > \dfrac{3}{4}
Its tangent at point P has slope 23\dfrac{2}{3}.
We need to find the point through with normal at P passes.
So first of all we know that slope of tangent is given by dydx\dfrac{{dy}}{{dx}}
And let us assume the point P has coordinates (α,β)\left( {\alpha ,\beta } \right)
So let us find dydx\dfrac{{dy}}{{dx}}at point (α,β)\left( {\alpha ,\beta } \right)
Given y(x)=1+4x3y(x) = 1 + \sqrt {4x - 3}
Now differentiating with respect to xxboth sides
dydx=1244x3 dydx=24x3  \dfrac{{dy}}{{dx}} = \dfrac{1}{2}\dfrac{4}{{\sqrt {4x - 3} }} \\\ \dfrac{{dy}}{{dx}} = \dfrac{2}{{\sqrt {4x - 3} }} \\\
So at point P(α,β)\left( {\alpha ,\beta } \right), it is given that slope is 23\dfrac{2}{3}. So, at x=α&y=βdydx=23x = \alpha \,\,\,\& \,\,\,y = \beta \,\,\,\,\,\,\,\,\,\dfrac{{dy}}{{dx}} = \dfrac{2}{3}
And dydx=24x3\dfrac{{dy}}{{dx}} = \dfrac{2}{{\sqrt {4x - 3} }}
Putting x=α&y=βx = \alpha \,\,\,\& \,\,\,y = \beta \,we get
24α3=23 4α3=3  \dfrac{2}{{\sqrt {4\alpha - 3} }} = \dfrac{2}{3} \\\ \sqrt {4\alpha - 3} = 3 \\\
Squaring both sides,
4α3=32 4α3=9 4α=12 α=3  4\alpha - 3 = {3^2} \\\ 4\alpha - 3 = 9 \\\ 4\alpha = 12 \\\ \alpha = 3 \\\
Then we know that y(x)=1+4x3y(x) = 1 + \sqrt {4x - 3} . So
β=  1+4α3 β=  1+4(3)3 β=  1+9 β=  1+3 β=  4  \beta = \;1 + \sqrt {4\alpha - 3} \\\ \beta = \;1 + \sqrt {4\left( 3 \right) - 3} \\\ \beta = \;1 + \sqrt 9 \\\ \beta = \;1 + 3 \\\ \beta = \;4 \\\
We get that coordinates of point P are P(3,4)\left( {3,4} \right)
Now we know that slope of tangent is 23\dfrac{2}{3}and mtangent×mnormal=1{m_{\tan gent}} \times {m_{normal}} = - 1as both are perpendicular.
So,
23×mnormal=1 mnormal=32  \dfrac{2}{3} \times {m_{normal}} = - 1 \\\ {m_{normal}} = - \dfrac{3}{2} \\\
Now equation of normal can be written as
y=mnormalx+cy = {m_{normal}}x + cand at point P it must satisfy P(3,4)\left( {3,4} \right). So,
4=32(3)+c c=4+92 c=172  4 = - \dfrac{3}{2}\left( 3 \right) + c \\\ c = 4 + \dfrac{9}{2} \\\ c = \dfrac{{17}}{2} \\\
So equation of normal will become
y=32x+172 2y+3x=17  y = - \dfrac{3}{2}x + \dfrac{{17}}{2} \\\ 2y + 3x = 17 \\\
Now let us check the option which satisfies this equation
Option A: (1,7)14+3=17\left( {1,7} \right) \Rightarrow 14 + 3 = 17.
So option A is correct.

Note: If two lines are given as y=m1x+cy = {m_1}x + c and y=m2x+cy = {m_2}x + c then angle between them is given by tanθ=m1m21+m1m2\tan \theta = \left| {\dfrac{{{m_1} - {m_2}}}{{1 + {m_1}{m_2}}}} \right|. So as normal and tangent are at right angle to each other so angle is 9090 and tanθ=\tan \theta = \infty therefore m1m2+1=0{m_1}{m_2} + 1 = 0 i.e. (m1m2=1)({m_1}{m_2} = - 1)