Understanding the Binomial Expansion of (x + 2)^4
The binomial theorem provides a powerful tool to expand expressions of the form (x + y)^n. In this case, we'll explore the expansion of (x + 2)^4.
The Binomial Theorem
The binomial theorem states:
(x + y)^n = ∑_(k=0)^n (n_C_k) x^(n-k) y^k
Where:
- n is a non-negative integer (the power)
- k is an integer ranging from 0 to n
- n_C_k represents the binomial coefficient, calculated as n! / (k! * (n-k)!), also known as "n choose k"
Applying the Theorem to (x + 2)^4
Let's apply the theorem to expand (x + 2)^4:
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Identify n: In this case, n = 4.
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Expand the summation: We need to expand the sum for k = 0, 1, 2, 3, and 4.
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Calculate binomial coefficients:
- 4_C_0 = 4! / (0! * 4!) = 1
- 4_C_1 = 4! / (1! * 3!) = 4
- 4_C_2 = 4! / (2! * 2!) = 6
- 4_C_3 = 4! / (3! * 1!) = 4
- 4_C_4 = 4! / (4! * 0!) = 1
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Substitute and simplify:
- (x + 2)^4 = (4_C_0) x^(4-0) 2^0 + (4_C_1) x^(4-1) 2^1 + (4_C_2) x^(4-2) 2^2 + (4_C_3) x^(4-3) 2^3 + (4_C_4) x^(4-4) 2^4
- (x + 2)^4 = 1x^4 + 4x^3 * 2 + 6x^2 * 4 + 4x * 8 + 1 * 16
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Final Expansion:
- (x + 2)^4 = x^4 + 8x^3 + 24x^2 + 32x + 16
Key Points
- The binomial theorem provides a systematic way to expand expressions of the form (x + y)^n.
- The coefficients in the expansion are represented by binomial coefficients.
- The expansion of (x + 2)^4 results in a polynomial with five terms, each with a distinct power of x.
By understanding the binomial theorem and its application, you can efficiently expand any binomial expression raised to a positive integer power.