To find the constant term in the expansion of , we can follow these steps:
Step 1: Identify the Expression
We are considering the expression . Here, and , and .
Step 2: Understanding the Constant Term
According to the binomial theorem, the expansion of is given by . In our case, we are looking for the constant term, which corresponds to the term where the power of is zero.
Step 3: Determine the Relevant Term
The constant term will come from a specific term in the expansion. This term is . For this term to be constant, the powers of in and must cancel out. So we have , and for it to be constant,
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