Mia has a jar containing nickels and dimes worth in total. If she has more dimes than nickels, how many of each coin does she have?
Table of contents
- 1. Review of Real Numbers2h 24m
- 2. Linear Equations and Inequalities3h 42m
- 3. Solving Word Problems2h 48m
- 4. Graphing4h 42m
- 5. Systems of Linear Equations2h 6m
- 6. Exponents and Polynomials3h 25m
- 7. Factoring2h 36m
- 8. Rational Expressions and Equations3h 51m
- Simplifying Rational Expressions39m
- Multiplying and Dividing Rational Expressions25m
- Adding and Subtracting Rational Expressions with Common Denominators24m
- Least Common Denominators32m
- Adding and Subtracting Rational Expressions with Different Denominators39m
- Rational Equations44m
- Direct & Inverse Variation27m
- 9. Roots and Radicals2h 46m
- 10. Quadratic Equations3h 2m
3. Solving Word Problems
Mixture Problem Solving
Multiple Choice
A technician needs to prepare a disinfectant by mixing a isopropyl alcohol solution with some solution to obtain alcohol. If the technician uses of the solution, how many mL of the solution must be added?
A
1500mL
B
600mL
C
667mL
D
67mL
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Verified step by step guidance1
Define the variable for the unknown volume of the 70% isopropyl alcohol solution to be added. Let this volume be \(x\) mL.
Write an expression for the total volume of the final mixture: \(500 + x\) mL, since 500 mL of the 50% solution is already used.
Set up an equation based on the amount of pure alcohol in the mixture. The amount of pure alcohol from the 70% solution is \$0.70x$, and from the 50% solution is \(0.50 \times 500\).
The total amount of pure alcohol in the final mixture should equal 65% of the total volume, so write the equation: \(0.70x + 0.50 \times 500 = 0.65 (500 + x)\).
Solve the equation for \(x\) by first expanding and simplifying both sides, then isolating \(x\) on one side to find the volume of the 70% solution needed.
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