Textbook Question
The volume V of a sphere of radius r changes over time t.
c. At what rate is the radius changing if the volume increases at 10 in³ when the radius is 5 inches?
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4. Applications of Derivatives
Related Rates
2:49 minutesProblem 13c
Textbook Question
The legs of an isosceles right triangle increase in length at a rate of 2 m/s.
c. At what rate is the length of the hypotenuse changing?
Verified step by step guidance1
Identify the relationship between the sides of an isosceles right triangle. The legs are equal, and the hypotenuse can be found using the Pythagorean theorem: \( c = \sqrt{2}a \), where \( a \) is the length of each leg and \( c \) is the hypotenuse.
Differentiate the Pythagorean theorem with respect to time \( t \) to find the rate of change of the hypotenuse. Start with \( c^2 = a^2 + a^2 = 2a^2 \).
Apply implicit differentiation to \( c^2 = 2a^2 \) with respect to \( t \): \( 2c \frac{dc}{dt} = 4a \frac{da}{dt} \).
Solve for \( \frac{dc}{dt} \), the rate of change of the hypotenuse: \( \frac{dc}{dt} = \frac{2a \frac{da}{dt}}{c} \).
Substitute the given rate of change of the legs \( \frac{da}{dt} = 2 \) m/s and the expression for \( c = \sqrt{2}a \) into the equation to find \( \frac{dc}{dt} \).
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Video duration:
2mKey Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Isosceles Right Triangle Properties
An isosceles right triangle has two equal sides and a right angle between them. The lengths of the legs are denoted as 'a', and the hypotenuse 'c' can be calculated using the Pythagorean theorem: c = a√2. Understanding these properties is essential for relating the sides of the triangle to each other.
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Related rates involve finding the rate at which one quantity changes in relation to another. In this problem, we need to determine how the length of the hypotenuse changes as the lengths of the legs increase. This requires applying differentiation to the relationship between the sides of the triangle.
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Differentiation is a fundamental concept in calculus that deals with finding the rate of change of a function. In this context, we will differentiate the equation relating the legs and the hypotenuse with respect to time to find the rate at which the hypotenuse is changing as the legs grow.
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