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Find the divergence of the field.The gravitational field in Figure 15.9 and Exercise 38 a in Section 15.3

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Calculus 1 / AB

Calculus 3

Chapter 15

Integrals and Vector Fields

Section 8

The Divergence Theorem and a Unified Theory

Integrals

Vectors

Vector Functions

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Harvey Mudd College

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London equal Negative one, um equal toe V zero equals a between brackets negative one one a not equal zero or equals one zero equal e part off negative T v zero x one Equal people off Negative t between brackets view on loose T V zero A minus. I part of two view, um Equals is even between brackets e minus. Ali view on not equals zero V zero equal the minus r e. We want In this case, we have e minus I equals negative toe negative toe, toe, toe and a minus I Part two equals zero and e minus. I view in not equals zero we choose for simplicity. V one equals one zero v zero equal negative too negative toe to toe one zero equal negative too to then x zero off the equals people off negative The negative toe to x one off t equal equals negative. T one zero loss team times negative toe to Finally, the general solution is x 50 equals. See you on there x of zero t. Thus see toe x one. The equal people off negative t between braces. See one times negative 11 los C two times one minus 2 30 Toothy we're see one equals to see. Um Bish

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