Textbook Question
CONCEPT PREVIEW Perform the operations mentally, and write the answers without doing intermediate steps. √6 • √6
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Ch. R - Algebra Review
Lial12th EditionTrigonometryISBN: 9780136552161
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Table of contents
- Ch. R - Algebra Review381
- Ch. 1 - Trigonometric Functions188
- Ch. 2 - Acute Angles and Right Triangles168
- Ch. 3 - Radian Measure and The Unit Circle155
- Ch. 4 - Graphs of the Circular Functions100
- Ch. 5 - Trigonometric Identities238
- Ch. 6 - Inverse Circular Functions and Trigonometric Equations158
- Ch. 7 - Applications of Trigonometry and Vectors148
- Ch. 8 - Complex Numbers, Polar Equations, and Parametric Equations15
Chapter 1, Problem 9
CONCEPT PREVIEW Perform the indicated operation, and write each answer in lowest terms 2x/5 + x/4
Verified step by step guidance1
Identify the terms to be added: \( \frac{2x}{5} + \frac{x}{4} \). Since these are fractions with different denominators, we need to find a common denominator before adding.
Find the least common denominator (LCD) of 5 and 4. The LCD is the smallest number that both denominators divide into evenly. Calculate the LCD as \( \text{LCD} = 20 \).
Rewrite each fraction with the denominator 20 by multiplying numerator and denominator appropriately: \( \frac{2x}{5} = \frac{2x \times 4}{5 \times 4} = \frac{8x}{20} \) and \( \frac{x}{4} = \frac{x \times 5}{4 \times 5} = \frac{5x}{20} \).
Add the two fractions now that they have the same denominator: \( \frac{8x}{20} + \frac{5x}{20} = \frac{8x + 5x}{20} = \frac{13x}{20} \).
Check if the resulting fraction \( \frac{13x}{20} \) can be simplified further by finding the greatest common divisor (GCD) of 13 and 20. Since 13 is a prime number and does not divide 20, the fraction is already in lowest terms.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Adding Rational Expressions
Adding rational expressions involves combining fractions with variable terms. To add them, you must have a common denominator, just like with numerical fractions, so the expressions can be combined into a single fraction.
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Rationalizing Denominators
Finding the Least Common Denominator (LCD)
The least common denominator is the smallest expression that both denominators divide into evenly. Finding the LCD allows you to rewrite each fraction with the same denominator, enabling straightforward addition of the numerators.
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3:42Rationalizing Denominators Using Conjugates
Simplifying Algebraic Fractions
After adding fractions, simplify the resulting expression by factoring and reducing common factors in the numerator and denominator. This ensures the answer is in lowest terms, making it easier to interpret and use.
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4:02Solving Linear Equations with Fractions
Related Practice
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CONCEPT PREVIEW Fill in the blank(s) to correctly complete each sentence. The circle with center (3, 6) and radius 4 has equation _________.
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CONCEPT PREVIEW Evaluate each expression. 3a - 2b, for a = -2 and b = -1
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Textbook Question
CONCEPT PREVIEW Use choices A–D to answer each question.
A. 3x² - 17x - 6 = 0
B.(2x + 5)² = 7
C. x² + x = 12
D. (3x - 1) (x - 7) = 0
Which quadratic equation is set up for direct use of the square root property? Solve it.
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Textbook Question
CONCEPT PREVIEW Rewrite the expression -7(x - 4y) using the distributive property.
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