Solveeit Logo
Login

Question

Question: The curve \(y-{{e}^{xy}}+x=0\) has the vertical tangent at the point A. \((1,1)\) B. \((0,1)\) ...

The curve yexy+x=0y-{{e}^{xy}}+x=0 has the vertical tangent at the point
A. (1,1)(1,1)
B. (0,1)(0,1)
C. (1,0)(1,0)
D. (0,0)(0,0)

Explanation

Solution

The curve yexy+x=0y-{{e}^{xy}}+x=0 has the vertical tangent means it is parallel to Y-axis and perpendicular to X-axis. So, from that find the slope of the line and then differentiate the curve yexy+x=0y-{{e}^{xy}}+x=0. After that, see whether the points satisfy the equation or not. The point which satisfies will be the required answer.

Complete step by step answer:

Here we are given in the problem that the curve has the vertical tangent means is parallel to Y-axis and perpendicular to X-axis.
So since it is at 9090{}^\circ to X-axis the slope is,
dydx=m=tan90\dfrac{dy}{dx}=m=\tan 90
We know that tan90=\tan 90=\infty .
So dydx=m=\dfrac{dy}{dx}=m=\infty
Now taking the curve yexy+x=0y-{{e}^{xy}}+x=0 and differentiating with respect to xx we get,
dydxexy(xdydx+y)+1=0\dfrac{dy}{dx}-{{e}^{xy}}(x\dfrac{dy}{dx}+y)+1=0
Now writing the above in terms of dydx\dfrac{dy}{dx}we get,
dydx=yexy11xexy\dfrac{dy}{dx}=\dfrac{y{{e}^{xy}}-1}{1-x{{e}^{xy}}}
Also, we know that dydx=\dfrac{dy}{dx}=\infty so 1xexy=01-x{{e}^{xy}}=0.
So, xexy=1x{{e}^{xy}}=1
Now we have got an equation let us see weather which point satisfies the equation.
Let us take option (A), here x=y=1x=y=1.
Taking LHS=(1)e1=e=(1){{e}^{1}}=e\ne RHS
Now option (B), here x=0,y=1x=0,y=1.
LHS=(0)e(0)=0=(0){{e}^{(0)}}=0\ne RHS
Option (C), x=1,y=0x=1,y=0
LHS=(1)e(0)=1==(1){{e}^{(0)}}=1=RHS
Option (D) both are zero which will not satisfy.
Therefore, (1,0)(1,0) satisfy the equation.
The curve yexy+x=0y-{{e}^{xy}}+x=0 has the vertical tangent at the point (1,0)(1,0).
Option C is the correct answer.

Note: Here we have used the core concept which is if the curve has a vertical tangent than it is parallel to Y-axis and perpendicular to X-axis. Also, the point is satisfied. Here we have took 1xexy=01-x{{e}^{xy}}=0 because dydx=\dfrac{dy}{dx}=\infty .
Additional information: The slope gives the measure of steepness and direction of a straight line. If the slopes of two lines on the Cartesian plane are equal, then the lines are parallel to each other. For two lines to be perpendicular the product of their slope must be equal to 1-1. The x and y coordinates of the lines are used to calculate the slope of the lines. It is the ratio of the change in the y-axis to the change in the x-axis.