In Exercises 67–82, find each product. (7xy 2 −10y)(7xy 2 +10y)

Hey everyone here we are asked to determine the product of the given expression which is the quantity of two X squared times Y cubed minus five times the quantity of two X squared times Y cubed plus five. Now here all we have to do is recall the difference of squares formula which tells us that the quantity of a minus B times the quantity of A plus B is equal to a squared minus B squared. And now here we can see that our expression is in the form of the quantity of a minus B times the quantity of A plus B. So we can see that our A. In the expression is two X squared times Y cubed and our B is equal to five. So with this information we can rewrite our given expression as the quantity of two X squared times Y cubed raised to the second power minus five, raised to the second power as well. Now just squaring both of these terms, we get a final answer of four X. To the fourth power times Y to the sixth power minus 25 which is our answer choice. D. Thanks for watching. I hope you found this video helpful and I'll see you again next time

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1:30 minutes

Problem 81

Textbook Question

In Exercises 67–82, find each product. (7xy²−10y)(7xy²+10y)

Verified step by step guidance

Step 1: Recognize that the given expression is a product of two binomials, (7xy² - 10y) and (7xy² + 10y). This is a special case of the difference of squares formula: (a - b)(a + b) = a² - b².

Step 2: Identify the terms 'a' and 'b' in the binomials. Here, 'a' is 7xy² and 'b' is 10y.

Step 3: Apply the difference of squares formula. Substitute 'a' and 'b' into the formula: a² - b² = (7xy²)² - (10y)².

Step 4: Simplify each squared term. For (7xy²)², square both the coefficient and the variables: (7²)(x²)(y⁴). For (10y)², square the coefficient and the variable: (10²)(y²).

Step 5: Write the simplified expression. Combine the results from Step 4 to express the product as: 49x²y⁴ - 100y².

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Factoring and the Difference of Squares

The expression given is in the form of a difference of squares, which follows the identity a^2 - b^2 = (a - b)(a + b). In this case, 7xy^2 is 'a' and 10y is 'b'. Recognizing this pattern allows for efficient multiplication and simplification of the expression.

Distributive Property

The distributive property states that a(b + c) = ab + ac. This property is essential for expanding polynomials, as it allows us to multiply each term in one polynomial by each term in the other. Understanding how to apply this property is crucial for correctly finding the product of the two binomials.

Combining Like Terms

After applying the distributive property, the resulting expression may contain like terms, which are terms that have the same variable factors raised to the same powers. Combining like terms involves adding or subtracting these terms to simplify the expression, leading to a more concise and manageable result.

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