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Arithmetic Reasoning Test Improvement
! Skills Needed for the Test * '''Deciding when to add/subtract/multiply/divide'''. If you know which of these steps you need to take with which numbers, then you have solved the problem. Most problems will spell it out, giving you clues to: ** ''subtract'' if the problem says "difference" or "how much more" ** ''add'' if it talks about one number "and" another ** ''divide'' if it asks "how many somethings will fit in some other thing?" ** ''cross-multiply'' if it talks about the "rate" or telling you to "scale" something (such as, a 20 pound bag is $5, how much does 160 pounds cost?). (Another example: "5 inches on a map represents 10 feet. How many feet is something that is 32 inches on the map?") ** ...more examples to come. * '''Cross-multiplication'''! The ASVAB loves to cross-multiply. So many problems boil down to this. The [Wikipedia article on Cross-multiplication|http://en.wikipedia.org/wiki/Cross-multiplication#Use] is pretty clear. You have to know this. * '''Understanding that a number can be:''' a percentage (25%), a fraction (1/4 or 4/16), a decimal .25, a ratio (1:4), or "a quarter" and not change its meaning at all. ** To convert a decimal (.25) to a fraction, put the original number over 1 (.25/1) then move the decimal place of both to the right, filling in with zeros, until you get rid of the decimal (25/100), then reduce the fraction (see below). ** To convert a fraction to a decimal, do the long division. 1/4 really means "1 divided by 4". ** To convert a percentage to a decimal, just move the decimal two places to the right. You can think of the % as two zeros (reminding you of how many to move) and an arrow telling you which way to move it (/). So, 25% becomes .25 in decimal. ** To convert a decimal to a percentage just do the opposite---move the decimal place two to the right. So, .25 becomes 25% again. ** Ratios are just fractions with a different symbol. 1:4 is 1/4, or spelled out: "one to four" is "one over four". * '''Convert units''' (inches/feet/yards, dozens, etc.). Many of the questions add these twists in to boost the difficulty, and most of the time the answer without the conversion is a choice. For example, if the answer is in feet, and it's looking for "3", then "36" is probably a choice. * '''Filter useless facts out'''. Figure out what information is useful. Some problems have numbers that you don't have to use at all. Just think deep and wide. * '''"Mess Questions"'''. Some have many numbers and you ''do'' have to use every last one of them. A typical Mess Question involves several conversions of units, many steps, many pieces, and many places to screw up. * '''Interest (financial)'''. Usually "simple interest", but a few "complex interest" thrown in here and there, but nothing you need to memorize a formula for. * '''Discounts'''. ASVAB is big on asking, "How much is this after a 25% discount?" and "This was discounted by 3%, how much was it before?" You just need to know: The discounted price is 100% minus the discount (so 75% if the discount is 25%). Multiply the original price by that new percent, and there is the discounted price. Or, to reverse the process, divide by the discounted price. This same trick is useful when asked how many are ''not'' in a group; for example, "32% of 550 people are men. How many people in the group are women?" Just subtract 32% from 100% then multiply: 68% (.68) times 550 is 374. * '''Price increases'''. The problem, "How much is a $200 product after a 35% price increase?" can easily be solved by adding 100% and 35% then multiplying: $200 times 1.35 is $270. * '''Time Calculation'''. [Dr. Math has it perfect|http://mathforum.org/library/drmath/view/58426.html] * '''Distributive Property'''. They want to be sure you know 5 * (10 + 2) is 5*10 + 5*2. I don't think it gets more complicated than that on the test. * '''Reducing fractions'''. Many times your answer will come out to something like 2/12, but that isn't on the list of choices. So you divide the top (the numerator) ''and'' the bottom (the denominator) by 2, and get: 1/6. When I'm reducing fractions I usually: ** divide by 10 if both numbers end in zero (that is, you drop a zero from the right of both numerator and denominator), ** divide by 5 if both numbers end in 5 ** divide by 2 if the number is even ** try dividing by 3 if the numbers are odd ** try other odd numbers. Once you've divided by everything from 2 to half the number, you can stop. ** start again from the top any time one of the steps works.
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Last changed: 2011/04/28 15:19