%5E4.jpeg "(2x-3y)^4")
Expanding (2x-3y)^4: A Step-by-Step Guide
Expanding expressions like (2x-3y)^4 can seem daunting, but with the right method, it becomes manageable. This article provides a clear breakdown of the process, using the Binomial Theorem and exploring the Pascal's Triangle as a helpful tool.
The Binomial Theorem
The Binomial Theorem is a powerful tool for expanding expressions of the form (a + b)^n. It states:
(a + b)^n = ∑(n choose k) a^(n-k) b^k
where:
- n is the power to which the binomial is raised.
- k is an integer ranging from 0 to n.
- (n choose k) represents the binomial coefficient, calculated as n! / (k! * (n-k)!).
Applying the Binomial Theorem to (2x-3y)^4
Let's apply the Binomial Theorem to our expression (2x-3y)^4:
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Identify a and b: In this case, a = 2x and b = -3y.
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Set n = 4: We are raising the binomial to the power of 4.
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Expand using the Binomial Theorem:
(2x - 3y)^4 = ∑(4 choose k) (2x)^(4-k) (-3y)^k
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Calculate the binomial coefficients:
- (4 choose 0) = 1
- (4 choose 1) = 4
- (4 choose 2) = 6
- (4 choose 3) = 4
- (4 choose 4) = 1
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Substitute the values and simplify:
(2x - 3y)^4 = (1)(2x)^4 (-3y)^0 + (4)(2x)^3 (-3y)^1 + (6)(2x)^2 (-3y)^2 + (4)(2x)^1 (-3y)^3 + (1)(2x)^0 (-3y)^4
= 16x^4 + 96x^3y + 216x^2y^2 + 216xy^3 + 81y^4
Pascal's Triangle: A Visual Aid
Pascal's Triangle provides a convenient way to visualize the binomial coefficients. Each row corresponds to a power of the binomial, and the numbers represent the binomial coefficients.
For (2x-3y)^4, we would look at the 5th row of Pascal's Triangle:
1
1 1
1 2 1
1 3 3 1
1 4 6 4 1
The numbers in the 5th row (1 4 6 4 1) correspond to the binomial coefficients we calculated previously.
Conclusion
Expanding (2x-3y)^4 using the Binomial Theorem is a systematic process. Understanding the theorem and utilizing Pascal's Triangle for visual aid can greatly simplify the expansion. This process can be generalized to any binomial raised to any power.