Q. 26

Question

In Exercises 19–26, write down an equation that relates the two quantities described. Then use implicit differentiation to obtain a relationship between the rates at which the quantities change over time. The area A and hypotenuse c of a triangle that is similar to a right triangle with legs of lengths 3 and 4 units and hypotenuse of length 5 units.

Step-by-Step Solution

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Answer

Equation relating the quantities: $A = \frac{6}{25} c^{2}$

Implicit differentiation: $\frac{d A}{d t} = \frac{12 c}{25} \frac{d c}{d t}$

1Step 1. Given information

Area of right angled triangle $= A$

Hypotenuse of right angled triangle $= c = 5 x$

Legs of the right angled triangle are: $3 x and 4 x$

2Step 2. Equation relating the quantities

Area of the triangle is given by,

$A = \frac{(b a s e) (h e i g h t)}{2} \Rightarrow A = \frac{(3 x) (4 x)}{2} \Rightarrow A = \frac{12 x^{2}}{2} \Rightarrow A = 6 x^{2} we have, c = 5 x Therefore, A = 6 {(\frac{c}{5})}^{2} \Rightarrow A = \frac{6}{25} c^{2}$

3Step 3. Implicit differentiation with respect to time

From the above step,

$A = \frac{6}{25} c^{2} Differentiating on both sides, we get, \frac{d A}{d t} = \frac{6}{25} (2 c) \frac{d c}{d t} \Rightarrow \frac{d A}{d t} = \frac{12 c}{25} \frac{d c}{d t}$

Q. 25

Q. 27

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