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Single Variable Calculus

8th Edition
James Stewart
Publisher: Cengage Learning
ISBN: 9781305266636

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BuyFindarrow_forward

Single Variable Calculus

8th Edition
James Stewart
Publisher: Cengage Learning
ISBN: 9781305266636
Chapter A, Problem 19E
Textbook Problem
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Solve the inequality in terms of intervals and illustrate the solution set on the real number line.

19. −1 < 2x − 5 < 7

To determine

To solve: The inequality in terms of intervals and illustrate the solution set on real time line.

Explanation of Solution

Given:

The expression is 1<2x5<7.

Calculation:

The inequality can be re written as,

1<2x5<71+5<2x<7+54<2x<1242<x<122

On further simplification,

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Chapter A Solutions

Single Variable Calculus
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Ch. A - Rewrite the expression without using the...Ch. A - Rewrite the expression without using the...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - Solve the inequality in terms of intervals and...Ch. A - The relationship between the Celsius and...Ch. A - Use the relationship between C and F given in...Ch. A - As dry air moves upward, it expands and in so...Ch. A - If a ball is thrown upward from the lop of a...Ch. A - Solve the equation for x. 43. |2x| = 3Ch. A - Solve the equation for x. 44. |3x + 5| = 1Ch. A - Solve the equation for x. 45. |x + 3| = |2x + 1|Ch. A - Solve the equation for x. 46. |2x1x+1|=3Ch. A - Solve the inequality. 47. |x| 3Ch. A - Solve the inequality. 48. |x| 3Ch. A - Solve the inequality. 49. |x 4| 1Ch. A - Solve the inequality. 50. |x 6| 0.1Ch. A - Solve the inequality. 51. |x + 5| 2Ch. A - Solve the inequality. 52. |x + 1| 3Ch. A - Solve the inequality. 53. |2x 3| 0.4Ch. A - Solve the inequality. 54. |5x 2| 6Ch. A - Solve the inequality. 55. 1 |x| 4Ch. A - Solve the inequality. 56. 0x512Ch. A - Solve for x, assuming a, b, and c are positive...Ch. A - Solve for x, assuming a, b, and c are positive...Ch. A - Solve for x, assuming a, b, and c are negative...Ch. A - Solve for x, assuming a, b, and c are negative...Ch. A - Suppose that |x 2| 0.01 and |y 3| 0.04. Use...Ch. A - Show that if x+312, then |4x + 13| 3.Ch. A - Show that if it a b, then aa+b2b.Ch. A - Use Rule 3 to prove Rule 5 of (2).Ch. A - Prove that |ab| = |a||b|. [Hint: Use Equation 4.]Ch. A - Prove that |ab|=ab.Ch. A - Show that if 0 a b, then a2 b2.Ch. A - Prove that |x y| |x| |y|. [Hint: Use the...Ch. A - Show that the sum, difference, and product of...Ch. A - (a) Is the sum of two irrational numbers always an...

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