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7(x+2)=49(2x3),x=7^{(x +2) }=49^{(2x-3)} , x=\rule{1cm}{ 0 .1 pt}

A5

B8/3

C5/3

D3

Answer:

B. 8/3

Read Explanation:

To find the value of xx in the equation 7(x+2)=49(2x3)7^{(x+2)} = 49^{(2x-3)}, follow these steps:

1. Equate the Bases

Since 4949 is 727^2, rewrite the equation using the same base:
7(x+2)=(72)(2x3)7^{(x+2)} = (7^2)^{(2x-3)}

2. Simplify the Exponents

Apply the power rule (am)n=amn(a^m)^n = a^{m \cdot n} to the right side:
7(x+2)=72(2x3)7^{(x+2)} = 7^{2(2x-3)}

7(x+2)=7(4x6)7^{(x+2)} = 7^{(4x-6)}

3. Solve for xx

Since the bases are equal, the exponents must be equal:
x+2=4x6x + 2 = 4x - 6

Rearrange the terms:
2+6=4xx2 + 6 = 4x - x

8=3x8 = 3x

Answer: x=83x = \mathbf{\frac{8}{3}} (or approximately 2.67).


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