If l is the ounces of liquid and we're wanting to know how much was lost at the end of day 12, then we must start with what was lost at the end of day 7 (the 3 ounces from day 2+the 6 ounces from day 7 for a total of 9 ounces lost). So we have l-9, but we also know that at the end of day 12, the remaining amount is one-third of that total. So divide l-9 by 3, and Answer 3 is the only correct choice.
Since the problem is asking for the numbers of d and b on a regular sale day, Answer 1 is the only choice that rings true. d+b=40 (number of combined units) and 10d with $10 being the regular price of DVDs while $18.75 is the regular price of Blu-ray adding up to $800.
He earned $740 in base pay and $260 in commission on $7,500 of sales. Approximately 3.5% is $260. Answer 3 is correct.
STEP ONE. Cross-multiply. STEP TWO. Add -3x to both sides, thus isolating C. STEP THREE. Multiply both sides * 1/3 to simplify 3C to C. STEP FOUR. Break down the quadratic equation (x+6)(x-4). Answer 3.
Using the process of elimination, you can dismiss B, C, and D, right away because the run-walk values are reversed. Answer 1 is the correct choice.
If 17 of the 1,000 are defective, that translates to around 1.7%. Read the statements carefully, and Answer 2 is the only one that is true.
STEP ONE. Multiply -4 to change the middle expression to 16z-28. STEP TWO. Don't forget to reverse inequality signs. STEP THREE. Convert the two fractions bookending the inequality. STEP FOUR. Look at the options. You want the highest possible integer value to fit the expression. You know 16z-28 is higher than 10 and 11, but it can't be 13, so that leaves Answer 3.
Simply plug in the pairs to both equations and get two true statements. Answer 4 is the correct choice.
STEP ONE. Cross-multiply to get rid of the unwieldy fraction. STEP TWO. Set common denominators of 3y for the left side of the equation and subtract, leaving you with -33y, or -1y. STEP THREE. Cross-multiply again to isolate y. STEP FOUR. Divide both sides of the equal sign by 7. Answer 1 is the correct choice.