Slopes, Tangent Lines, and Normal Lines

Question

In Exercises 31–40, verify that the given point is on the curve and find the lines that are (a) tangent and (b) normal to the curve at the given point.

y = 2 sin(πx – y), (1,0)

Accepted Answer

Find the equations for the tangent and normal lines to the curve at the indicated point. Y equals for a cosine. F3IX divided by 2 minus Y, at 13 0. Now, to solve for this, we'll first use the derivative to find the slope of the tangent line. We have D D X of our equation, Y equals for cosine. 3 pi X divided by 2 minus Y. This gives us D Y D X for our left side. On the right side, we have a chain rule. The derivative will be -4. Sign of our interior function. Multiplied by the derivative of the interior function. 35 X. Divided by 2 minus Y. Now, we just need the derivative of the interior function. If we bring down -4, 3 pi X divided by 2 minus Y, we can multiply that by this derivative. Which is 3 pi divided by 2. Minus DYD X. Now, let's solve for DYDX. So we have to expand our equation. By multiplying This will be -4, sign. 3 X divided by 2 minus Y multiplied by 3 pi divided by 2. Plus 4 sign. 3 X divided by 2 minus Y. Well it's fun. By DY. DX. We'll move all the terms with DYDX to the left side. To get DYDX. Minus Or 3 X divided by 2. Minus Y T Y T X. Equals Now 4 sun. 3 X divided by 2 minus Y multiplied by 3 pi divided by 2. Now, we just factor out DYDX on the left side. To get DYDX multiplied by 1 minus or sign. 3 X divided by 2 minus Y. Equals everything on the right side. Of the equal sign. Finally, Let's divide our term on the left side to get DYDX by itself. The YBX equals. Now you Son 3 IX Divided by 2, minus Y multiplied. By 3 pi divided by 2, all divided by 1 minus 4 sin. 3 by X divided by 2 minus Y. No, we just need to plug in our points of 1/30. If we replace our X and Y. DYDX of 1/30 will be equals. 225. That is our tangent slope. No. Let's find our equations of reliance. Or equation of tangent line. We have Y minus Y1 equals M multiplied by X minus X1. We'll then have Y minus 0 equals 2 multiplied by X minus 1/3. We get y equals. Toy X. M 2 divided by 3. We can also find the equation of our normal line. By taking our tangent slope, And finding its reciprocal. This will be one. Divided by a tangent slope. Multiplied by -1. This is 1 divided by 2 pi multiplied by -1, which is just -1 divided by 2 pi. Now, we'll plug this back into our pointslo form. We have, why? Minus 0 equals -1 divided by 2 pi multiplied. By x minus 1/3. We get Y equals negative X divided by 2 pi. Plus one. Divided by 6 pi. We now have both of our equations, our tangent equation. 2 X Minus 2/35. And our normal equation, negative X, divided by 2 pi plus 1 divided by 6 pi. OK, I hope to help you solve the problem. Thank you for watching. Goodbye.

Slopes, Tangent Lines, and Normal Lines

In Exercises 31–40, verify that the given point is on the curve and find the lines that are (a) tangent and (b) normal to the curve at the given point.

y = 2 sin(πx – y), (1,0)

Key Concepts

Point Verification on a Curve

Tangent Line to a Curve

Normal Line to a Curve

Watch next