Simplifying Exponential Expressions: How to Solve e^x e^y and Get e^(x + y)

e^x e^y

To solve the expression e^x e^y, we can use the properties of exponents and the rules of exponential expressions

To solve the expression e^x e^y, we can use the properties of exponents and the rules of exponential expressions.

The rules state that when multiplying exponential expressions with the same base, we add the exponents. In this case, the base is e, which is a mathematical constant approximately equal to 2.71828.

So when we multiply e^x by e^y, we add the exponents:

e^x e^y = e^(x + y)

Therefore, the simplified form of e^x e^y is e^(x + y).

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