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Calculus with Applications | 10th Edition | ISBN: 9780321749000 | Authors: Margaret L. Lial, Raymond N. Greenwell, Nathan P. Ritchey
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Zenzizenzicube Zenzizenzicube is another obsolete word

Chapter 4, Problem 67A

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QUESTION:

Problem 67A

Zenzizenzicube Zenzizenzicube is another obsolete word (see Exercise 1) that represents the square of the square of a cube. In symbols, zenzizenzicube is written as ((x3)2)2. Source: The Phrontistery.

a. Use the chain rule twice to find the derivative.

b. Use the properties of exponents to first simplify the expression, and then find the derivative.

Exercise 1

Zenzizenzizenzic Zenzizenzizenzic is an obsolete word with the distinction of containing the most z’s of any word found in the Oxford English Dictionary. It was used in mathematics, before powers were written as superscript numbers, to represent the square of the square of the square of a number. In symbols, zenzizenzizenzic is written as ((x2)2)2. Source: The Phrontistery.

a. Use the chain rule twice to find the derivative.

b. Use the properties of exponents to first simplify the expression, and then find the derivative.

Questions & Answers

QUESTION:

Problem 67A

Zenzizenzicube Zenzizenzicube is another obsolete word (see Exercise 1) that represents the square of the square of a cube. In symbols, zenzizenzicube is written as ((x3)2)2. Source: The Phrontistery.

a. Use the chain rule twice to find the derivative.

b. Use the properties of exponents to first simplify the expression, and then find the derivative.

Exercise 1

Zenzizenzizenzic Zenzizenzizenzic is an obsolete word with the distinction of containing the most z’s of any word found in the Oxford English Dictionary. It was used in mathematics, before powers were written as superscript numbers, to represent the square of the square of the square of a number. In symbols, zenzizenzizenzic is written as ((x2)2)2. Source: The Phrontistery.

a. Use the chain rule twice to find the derivative.

b. Use the properties of exponents to first simplify the expression, and then find the derivative.

ANSWER:

Solution :

Step 1 :

In this problem, we have to find the derivative of the function using chain rule .

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