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This article was co-written by Jake Adams. Jake Adams is a tutor and owner of PCH Tutors, a business in Malibu, California that provides tutoring and learning resources for kindergarten through college, SAT & ACT preparation materials, and private tutoring. college admissions inquiries. With over 11 years of experience as a tutor, Jake is also the CEO of Simplifi EDU – an online tutoring service with the goal of helping customers access a network of excellent tutors in California. Jake holds a bachelor’s degree in international business and marketing from Pepperdine University.
This article has been viewed 21,392 times.
Unlike a straight line, the slope (slope) is constantly changing as it moves along the curve. Calculus gives the idea that each point on a graph can be represented by a slope, or “instantaneous rate of change”. A tangent at a point is a line with the same slope and passing through the same point. To find the equation of the tangent line, you need to know how to derive the original equation.
Steps
Find the equation of the tangent line
- Example 1: Draw parabp f(x)=0.5x2+3x−first{displaystyle f(x)=0.5x^{2}+3x-1} . Draw a tangent line through the point (-6, -1).
Even if you don’t know the tangent equation, you can still see that its slope is negative and the coordinate is negative (it’s far below the parabp vertex with the coordinate equal to -5.5). If the final answer found does not match these details, there must be an error in the calculation and you need to check again.
- Example 1 (cont): The graph is given by the function f(x)=0.5x2+3x−first{displaystyle f(x)=0.5x^{2}+3x-1} .
Remember the rule of exponentiation when taking derivatives: ddxxn=nxn−first{displaystyle {frac {d}{dx}}x^{n}=nx^{n-1}} .
First derivative of the function = f'(x) = (2)(0.5)x + 3 – 0.
f'(x) = x + 3. Replace x with any value of a, the equation will give us the slope of the tangent to the function f(x) at the point x = a.
- Example 1 (cont’d): The score mentioned in the question is (-6, -1). Use the -6 coordinate to replace f'(x):
f'(-6) = -6 + 3 = -3
The slope of the tangent line is -3.
- Example 1 (cont’d): y−yfirst=square meter(x−xfirst){displaystyle y-y_{1}=m(x-x_{1})}
The slope of the tangent line is -3, so: y−yfirst=−3(x−xfirst){displaystyle y-y_{1}=-3(x-x_{1})}
The tangent line passes through the point (-6, -1), so the final equation is: y−(−first)=−3(x−(−6)){displaystyle y-(-1)=-3(x-(-6))}
Simplify we get: y+first=−3x−18{displaystyle y+1=-3x-18}
y=−3x−19{displaystyle y=-3x-19}
- Example 1 (cont): The initial drawing shows that the tangent line has negative slope and the origin is far below -5.5. The tangent equation just found is y = -3x -19, which means -3 is the slope and -19 is the origin.
- Find the first derivative using the power rule: fs(x)=3x2+4x+5{displaystyle f'(x)=3x^{2}+4x+5} . This function will give us the slope of the tangent.
- For x = 2, find fs(2)=3(2)2+4(2)+5=25{displaystyle f'(2)=3(2)^{2}+4(2)+5=25} . This is the slope at x = 2.
- Notice that this time, we don’t have a point and only the x coordinates. To find the y coordinate, replace x = 2 in the original function: f(2)=23+2(2)2+5(2)+first=27{displaystyle f(2)=2^{3}+2(2)^{2}+5(2)+1=27} . The score obtained is (2.27).
- Write an equation of the tangent line that passes through a point and has a given slope: y−yfirst=m(x−xfirst){displaystyle y-y_{1}=m(x-x_{1})}
y−27=25(x−2){displaystyle y-27=25(x-2)}
If necessary, reduce to y = 25x – 23.
Solve related problems
- Take the first derivative of the function to get f'(x), the tangent slope equation.
- Solve the equation f'(x) = 0 to find the potential extreme point .
- Taking the second derivative to get f”(x), the equation tells us the rate of change of the slope of the tangent.
- At each potential extreme point, substitute the coordinate a into f”(x). If f”(a) is positive, we have a local minimum at a . If f”(a) is negative, we have a local maximum. If f”(a) is 0, that’s not an extreme but an inflection point.
- If the maximum or minimum is reached at a , find f(a) to determine the coordinates.
- Find f'(x), the slope of the tangent line.
- If at a given point we have x = a : find f'(a) to determine the slope at that point.
- Calculate −firstfs(a){displaystyle {frac {-1}{f'(a)}}} to find the slope of the normal.
- Write the equation of the normal line given the slope and a point through which it passes.
Advice
- If necessary, rewrite the original equation in standard form: f(x) = … or y = …
This article was co-written by Jake Adams. Jake Adams is a tutor and owner of PCH Tutors, a business in Malibu, California that provides tutoring and learning resources for kindergarten through college, SAT & ACT preparation materials, and private tutoring. college admissions inquiries. With over 11 years of experience as a tutor, Jake is also the CEO of Simplifi EDU – an online tutoring service with the goal of helping customers access a network of excellent tutors in California. Jake holds a bachelor’s degree in international business and marketing from Pepperdine University.
This article has been viewed 21,392 times.
Unlike a straight line, the slope (slope) is constantly changing as it moves along the curve. Calculus gives the idea that each point on a graph can be represented by a slope, or “instantaneous rate of change”. A tangent at a point is a line with the same slope and passing through the same point. To find the equation of the tangent line, you need to know how to derive the original equation.
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