Use the Binomial Theorem to expand each binomial and express t...

Question

Use the Binomial Theorem to expand each binomial and express the result in simplified form. $(2 x + 1)^{4}$

Accepted Answer

Hey everyone here we are asked to perform binomial expansion and simplify the resulting expression for the given binomial where we have the quantity of five X plus one raised to the fourth power. So before we can begin expanding, we need to recall the formula for binomial expansion which is the quantity of A plus B to the end power is equal to. And then we see start with n zero times A. To the power of N plus n. One times A. To the power of n minus one times B plus n. Two times A. To the power of n minus two times B squared plus. And then I'm going to continue down here below. We have N three times A. To the power of n minus three times B cubed. And then we continue expanding here until we are left with N N times B to the power of N. And this expansion here is equivalent to the sum from R is equal to zero to n. Of n. R N R times A. To the power of n minus R, times B to the power of R. And so with this formula here we can go ahead and start our expansion for our given binomial which again we have the quantity of five X plus one to the power of four. So in this case our binomial is raised to the fourth power. So our end is going to be equal to four. So now using our formula here and keeping the A. And B variables the same for now we have the quantity of a plus B to the fourth power is equal to. And now again we're replacing N with four. So we have +40 to times A. To the power of four plus 41 times A to the power of three times B plus four, two times a squared times B squared plus four, three times a times B cubed plus four four. And we have times B to the fourth power. And now with this, we just want to simplify this expansion here by writing out our coefficients for the binomial expansion. So if you recall solving for these coefficients, we are left with A to the power of four plus four times a cubed times B plus six A squared times B square plus four A times B cubed plus B to the fourth power. And now with this we just need to replace our A and B terms from the formula with the proper terms from our given expression here. So our A. Is going to be the left hand term from our given expression. So A is going to be five X. And then B. Is this left side? This term on the left side of the expression. So B is going to be just one. And now we just substitute in these terms here. So we have the quantity of five X plus B which is one to the power of four is equal to And now substituting in these values. We have five X to the power of four plus four times five X raised to the third power times 14 B plus six times A. Which again is five X. Raised to the second power times B. Which again is one raised to the second power as well. Plus four times five X times one cute. And finally we have plus one raised to the 4th power. And so with this we just need to simplify our expression here. So we are left with the quantity of five X plus one raised to the fourth. Power is equal to X. To the or I mean we need the coefficient here raised to the fourth. So we have 625 X. To the fourth power plus 500 X cubed plus 150 X squared plus 20 X plus one. And with this we have our simplified expansion and we are left with answer choice C. Thanks for watching. I hope you found this video helpful and I'll see you again next time.

Use the Binomial Theorem to expand each binomial and express the result in simplified form. $(2 x + 1)^{4}$

Key Concepts

Binomial Theorem

Binomial Coefficients

Simplifying Polynomial Expressions

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Use the Binomial Theorem to expand each binomial and express the result in simplified form. (2x+1)4(2x + 1)^4

Key Concepts

Binomial Theorem

Binomial Coefficients

Simplifying Polynomial Expressions

Watch next

Use the Binomial Theorem to expand each binomial and express the result in simplified form. $(2 x + 1)^{4}$