Question:
Which of the options show parts of the graph representing the equation 𝑥𝑦 = 25 ?
Which of the options show parts of the graph representing the equation 𝑥𝑦 = 25 ?
Updated On: Sep 8, 2025
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The Correct Option is C, D
Solution and Explanation
To determine which of the given graphs represent the equation \(x^y = 25\), we must identify the relationships that satisfy this equation. For a given \(x, y\), we need \(x^y = 25\). Here's how we can break it down:
- Rewriting, we have \(y = \log_{x} 25\) which suggests for a fixed x, y is determined such that \(x^y = 25\).
- Important to note is that this condition implies that both \(x\) and \(y\) need to adapt to satisfy the equation, effectively creating a curve.
- Analyze graphs to match the behavior defined by \(x^y = 25\), which can display exponential-like curves.
Among the options provided, the graphs in 
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