Mada za sehemu hiiDifferentiationMada 3
- Techniques of Differentiation
- Applications of differentiation
- Rates of change
Applications of differentiation
Differentiation can be applied in many areas. Some common applications include finding:
- Slope of curves
- Rate of change
- Critical points of a curve
- Marginal cost
- Marginal revenue
Slope of a curve at a given point
The slope of a curve at a given point is defined as the slope of the tangent line to the curve at that point. It measures the rate of increase (or decrease) of with respect to . The slope of the curve is always equal to the slope of the tangent at the point of contact.
Consider a curve and a point on the curve.
Figure 4.2: Illustration showing the slope of a curve at a given point
The slope at is given by the derivative:
Example
Find the slope of the curve at the point .
Solution:
The slope is given by:
Differentiating with respect to :
At the point , substitute :
Therefore, the slope of the curve at is 8.
Example
Calculate the gradient of the tangent to the curves:
- at
- at
Solution:
a. Given , differentiate:
At :
Thus, the gradient at is 2.
b. Given , first expand:
Differentiating:
At :
Therefore, the gradient at is 4.
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