Evaluate each expression for x = − 4 x = -4 and y = 2 y = 2 . ∣ 2 x − 5 y ∣ |2x - 5y|

Solve the expression for the given values where we have the absolute value of eight P minus 13 Q. Where PS 96 Q. is one. So we know negative six and one R. P. And Q. Let's plug this into our equation, absolute value eight times negative six minus 13 times one. Let's go ahead and simplify this. We have eight times in eight of six. Which is this negative 48 negative 13 times one is just negative 13. The 48 -13 that simplifies to -61. Now we have the absolute value of a negative number. We have a property that states our answer is just a itself. So if you look here we have a negative 61 by our property. The answer to our problem turns out to be 61. This means the answer is the answer. A. Okay I hope to help you solve the problem. Thank you for watching. Goodbye.

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1:07 minutes

Problem 144

Textbook Question

Evaluate each expression for $x = - 4$ and $y equals 2$ .
$∣ 2 x - 5 y ∣$

Verified step by step guidance

Substitute the given values of $ x = -4 $ and $ y = 2 $ into the expression $ |2x - 5y| $. This means replacing $ x $ with $ -4 $ and $ y $ with $ 2 $ in the expression.

Rewrite the expression with the substituted values: $ |2(-4) - 5(2)| $.

Perform the multiplication inside the absolute value: calculate $ 2 \times (-4) $ and $ 5 \times 2 $ separately.

Simplify the expression inside the absolute value by combining the results from the multiplications: $ |-8 - 10| $.

Evaluate the absolute value by finding the distance of the number inside from zero, which means taking the positive value of the result inside the absolute value bars.

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Key Concepts

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

Substitution of Variables

Substitution involves replacing variables in an expression with given numerical values. In this problem, x and y are replaced by -4 and 2 respectively, allowing evaluation of the expression with specific numbers.

Order of Operations

The order of operations dictates the sequence in which parts of an expression are calculated, typically parentheses, exponents, multiplication/division, and addition/subtraction. Correctly applying this ensures accurate evaluation of expressions like 2x - 5y.

Absolute Value

Absolute value represents the distance of a number from zero on the number line, always yielding a non-negative result. For example, | -3 | equals 3, so after evaluating 2x - 5y, taking the absolute value ensures the final answer is non-negative.

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