For What Value Of A Does 9 = (Startfraction 1 Over 27 Endfraction) Superscript A + 3? Negative Eleven-Thirds Negative Seven-Thirds Seven-Thirds Eleven-Thirds

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For What Value Of A Does 9 = (Startfraction 1 Over 27 Endfraction) Superscript A + 3? Negative Eleven-Thirds Negative Seven-Thirds Seven-Thirds Eleven-Thirds. Learn how to solve for a in the equation 9 = (1/27)^ (a+3) using the product rule, the negative exponent rule, and the equation with equal bases. The number 9 can be expressed as 3^2, and 1/27 can.

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Convert fraction into negative exponential form: 6 = (1/27)^a now, we need to find the value of a that satisfies this equation. Rewrite the numbers in terms of a common base.

To Find The Value Of A, We Can Rewrite The Equation As:


6 = (1/27)^a now, we need to find the value of a that satisfies this equation. You'll get a detailed solution from a subject matter expert that helps you learn core concepts. Learn how to solve for a in the equation 9 = (1/27)^ (a+3) using the product rule, the negative exponent rule, and the equation with equal bases.

Convert Fraction Into Negative Exponential Form:


To find the value of a, we can start by rewriting the equation: The number 9 can be expressed as 3^2, and 1/27 can. Recognize that 9 can be written as 32.

To Solve The Equation 9 = (1/27)^ (A + 3), We Will Follow A Systematic Approach.


9 = (1/27)^a + 3 subtract 3 from both sides: For what value of a does 9 = (startfraction 1 over 27 endfraction) superscript a + 3? Is equivalent to 27−1, and 27 can be expressed as 33.

Thus, The Value Of A Is −38, Which Is Approximately.


So, 271 = (33)−1 = 3−3. 9 = (1/27) a+3 9 = 1/27 * 3a 9 = a/9 show. Applying this rule, we get:

Rewrite The Numbers In Terms Of A Common Base.


For what value of a does. 9 = (1/27)^a + 3 subtract 3 from both si.

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