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EXAMPLE 1 Rewrite a formula with two variables Solve the formula C = 2πr for r. Then find the radius of a circle with a circumference of 44 inches. SOLUTION C = 2πr C 2π = r STEP 1 Solve the formula for r. STEP 2Substitute the given value into the rewritten formula. Write circumference formula. Divide each side by 2π. r = C 2π = 44 2π 7 Substitute 44 for C and simplify. The radius of the circle is about 7 inches. ANSWER
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GUIDED PRACTICE for Example 1 Find the radius of a circle with a circumference of 25 feet. 1. The radius of the circle is about 4 feet. ANSWER
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GUIDED PRACTICE for Example 1 The formula for the distance d between opposite vertices of a regular hexagon is d = where a is the distance between opposite sides. Solve the formula for a. Then find a when d = 10 centimeters. 2. 2a2a 3 SOLUTION d3 a = 2 35 When d = 10cm, a = or 8.7cm
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EXAMPLE 2 Rewrite a formula with three variables SOLUTION Solve the formula for w. STEP 1 P = 2l + 2w P – 2l = 2w P – 2l 2 = w Write perimeter formula. Subtract 2l from each side. Divide each side by 2. Solve the formula P = 2l + w for w. Then find the width of a rectangle with a length of 12 meters and a perimeter of 41 meters.
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EXAMPLE 2 Rewrite a formula with three variables 41 – 2(12) 2 w = w = 8.5 Substitute 41 for P and 12 for l. Simplify. The width of the rectangle is 8.5 meters. ANSWER Substitute the given values into the rewritten formula. STEP 2
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GUIDED PRACTICE for Example 2 Solve the formula P = 2l + 2w for l. Then find the length of a rectangle with a width of 7 inches and a perimeter of 30 inches. 3. Length of rectangle is 8 in. ANSWER Solve the formula A = lw for w. Then find the width of a rectangle with a length of 16 meters and an area of 40 square meters. 4. Write of rectangle is 2.5 m w = A l ANSWER
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GUIDED PRACTICE for Example 2 Solve the formula for the variable in red. Then use the given information to find the value of the variable. A = 1 2 bhbh 5. Find h if b = 12 m and A = 84 m 2. = h 2A2A b ANSWER
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GUIDED PRACTICE for Example 2 Find the value of h if b = 12m and A = 84m 2. Find h if b = 12 m and A = 84 m 2. = h 2A2A b h = 14m ANSWER
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GUIDED PRACTICE for Example 2 Find b if h = 3 cm Solve the formula for the variable in red. Then use the given information to find the value of the variable. A = 1 2 bhbh 6. and A = 9 cm 2. = b 2A2A h ANSWER
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GUIDED PRACTICE for Example 2 Find b if h = 3 cm Solve the formula for the variable in red. Then use the given information to find the value of the variable. A = 1 2 bhbh 6. and A = 9 cm 2. b = 6cm ANSWER
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GUIDED PRACTICE for Example 2 Solve the formula for the variable in red. Then use the given information to find the value of the variable. A = 1 2 7. (b 1 + b 2 )h Find h if b 1 = 6 in., b 2 = 8 in., and A = 70 in. 2 h =h = 2A2A (b 1 + b 2 ) ANSWER
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GUIDED PRACTICE for Example 2 Solve the formula for the variable in red. Then use the given information to find the value of the variable. A = 1 2 7. (b 1 + b 2 )h Find h if b 1 = 6 in., b 2 = 8 in., and A = 70 in. 2 h = 10 in. ANSWER
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EXAMPLE 3 Rewrite a linear equation Solve 9x – 4y = 7 for y. Then find the value of y when x = –5. SOLUTION Solve the equation for y. STEP 1 9x – 4y = 7 –4y = 7 – 9x y = 9 4 7 4 – + x Write original equation. Subtract 9x from each side. Divide each side by –4.
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EXAMPLE 3 Rewrite a linear equation Substitute the given value into the rewritten equation. STEP 2 y = 9 4 7 4 – + (–5) y = 45 4 7 4 – – y = –13 CHECK 9x – 4y = 7 9(–5) – 4(–13) 7 = ? 7 = 7 Substitute – 5 for x. Multiply. Simplify. Write original equation. Substitute – 5 for x and – 13 for y. Solution checks.
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EXAMPLE 4 Rewrite a nonlinear equation Solve 2y + xy = 6 for y. Then find the value of y when x = –3. SOLUTION Solve the equation for y. STEP 1 2y + x y = 6 (2+ x) y = 6 y = 6 2 + x Write original equation. Distributive property Divide each side by (2 + x).
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EXAMPLE 4 Rewrite a nonlinear equation Substitute the given value into the rewritten equation. STEP 2 y = 6 2 + (–3) y = – 6 Substitute –3 for x. Simplify.
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GUIDED PRACTICE for Examples 3 and 4 Solve the equation for y. Then find the value of y when x = 2. 8. y – 6x = 7 y = 7 + 6x y = 19 ANSWER 9. 5y – x = 13 y = x 5 13 5 + y = 5 ANSWER 10. 3x + 2y = 12 y = – 3x3x 2 + 6 ANSWER y = 3
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GUIDED PRACTICE for Examples 3 and 4 Solve the equation for y. Then find the value of y when x = 2. 11. 2x + 5y = –1 12. 3 = 2xy – x 13. 4y – xy = 28 y = 14 28 4 – x y = ANSWER y = 1 4 1 3 +x 2x y = ANSWER 2x2x 5 –1 5 – y = –1 y = ANSWER
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EXAMPLE 5 Solve a multi-step problem Write an equation that represents the store’s monthly revenue. Solve the revenue equation for the variable representing the number of new movies rented. Movie Rental A video store rents new movies for one price and older movies for a lower price, as shown at the right. The owner wants $12,000 in revenue per month. How many new movies must be rented if the number of older movies rented is 500? 1000?
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EXAMPLE 5 Solve a multi-step problem SOLUTION Write a verbal model. Then write an equation. STEP 1 An equation is R = 5n 1 + 3n 2. Solve the equation for n 1. STEP 2
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EXAMPLE 5 Solve a multi-step problem R = 5n 1 + 3n 2 R – 3n 2 = 5n 1 R – 3n 2 5 = n 1 Write equation. Subtract 3n 2 from each side. Divide each side by 5. Calculate n 1 for the given values of R and n 2. STEP 3 = 2100. If n 2 = 500, then n 1 12,000 – 3 500 5 = If n 2 = 1000, then n 1 = 1800. 12,000 – 3 1000 5 = If 500 older movies are rented, then 2100 new movies must be rented. If 1000 older movies are rented, then 1800 new movies must be rented. ANSWER
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GUIDED PRACTICE for Example 5 14. What If? In Example 5, how many new movies must be rented if the number of older movies rented is 1500 ? If 1500 older movies are rented, then 1500 new movies must be rented ANSWER
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GUIDED PRACTICE for Example 5 15. What If? In Example 5, how many new movies must be rented if customers rent no older movies at all? If 0 older movies are rented, then 2400 new movie must be rented ANSWER
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GUIDED PRACTICE for Example 5 16. Solve the equation in Step 1 of Example 5 for n 2. R – 5n 1 3 n 2 = ANSWER
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