SSAT Upper Level Math : SSAT Upper Level Quantitative (Math)

Study concepts, example questions & explanations for SSAT Upper Level Math

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Example Questions

Example Question #3 : How To Find Decimal Fractions

Convert  to a decimal to three decimal places.

Possible Answers:

Correct answer:

Explanation:

To convert any fraction to a decimal, the numerator is in the dividend and the denominator is the divisor. Then divide as you would normally. Just remember that since  can't divide into , add a decimal point after the  and however many s needed. 

 

Example Question #6 : How To Find Decimal Fractions

Convert  to a decimal. Answer to 3 decimal places. 

Possible Answers:

Correct answer:

Explanation:

See if you can reduce the fraction before converting to a decimal. They both are divisible by , so the new fraction becomes . To convert any fraction to a decimal, the numerator is in the dividend and the denominator is the divisor. Then divide as you would normally. Just remember that since  can't divide into , add a decimal point after the  and however many s needed. 

Example Question #271 : Fractions

Which of the following is the smallest?

I. 

II.

III. 

 

IV. 

V. 

Possible Answers:

IV.

V

I

II

III

Correct answer:

IV.

Explanation:

There is no other way but to analyze each answer choice. We do have a decimal choice so lets compare the decimal to all of the fractions. Choice I. is . Even if you don't see that, first divide the numerator and denominator by , then , and you will see that it's  Choice is wrongChoice II is definitely bigger than . Reason is because if you look at the numerator, if I double it, that number is . Because this value is bigger than the denominator, this means the overall fraction is bigger than  Remember, the bigger the denominator, the smaller the fraction. ( is greater than   even though  is bigger than ) The converse is the same. If apply this reasoning to both Choice III and V, only choice V can be eliminated. Choice III is hard to figure out the exact decimal value but if we didn't have a calculator, we can surely compare their values. Let's force choice IV into a fraction. The only way to compare these fractions easily is by having the same denominator. So, lets multiply  with  which gives us . So we are comparing  with . Since  is greater than  this makes choice III bigger than  and therefore makes choice IV the smallest value. 

Example Question #8 : How To Find Decimal Fractions

Which of the following is the biggest?

I. 

II. 

III.

IV. 

v. 

Possible Answers:

II

V

I

IV

III

Correct answer:

III

Explanation:

Convert the easy fractions to a decimal. Only choice IV is simple and that value is . Lets compare to choice III which also has a decimal. Choice III is greater than choice IV so thats elminated. Lets apply a techique to determine the strengths of fractions. Lets compare choice I and II. We will cross-multiply these values but when we cross-multiply, multiply the denominator of the left fraction with the numerator of the right fraction and the product will be written next to the numerator of the right fraction. Same is done with multiplying the denominator of the right fraction with the numerator of the left fraction and the product will be written next to the numerator of the left fraction. Whichever product is greater means that fraction is greater than the other. So with choice and II, we have products of 10200 versus 10201. Clearly 10201 is greater and that corresponds to choice II so choice I is eliminated. Lets compare now choice II and choice V. Applying this method, gives choice II the edge here. So now lets compare choice III and II. Lets convert the decimal to a fraction with a denominator of . This gives us a comparison of  to  which means choice III is clearly the biggest.  

Example Question #9 : How To Find Decimal Fractions

Which fraction is equivalent to the decimal of ?

Possible Answers:

Correct answer:

Explanation:

By inspection, each answer choice has a denominator of  with the exception of the fraction of . This can be fixed by dividing the fraction by  which will be . To find the correct numerator value, just multiply  by  which is 

Example Question #11 : How To Find Decimal Fractions

Convert  to a fraction. 

Possible Answers:

Correct answer:

Explanation:

Lets try to get these values into whole numbers. To do that, we need to make sure both numerator and denominator are whole numbers and we will look for the number with the most decimal places. This is found in the numerator. To get it into a whole number, we will multiply by  or move the decimal places  to the right. When you do that for the numerator, the same applies for the denominator. The new fraction is . Just reduce the fraction by factoring out a  and the answer is shown. 

Example Question #331 : Number Concepts And Operations

What's the answer in decimal form?

Possible Answers:

Correct answer:

Explanation:

Convert each fraction to decimal. We have  and . Add these values. Remember when adding decimals, make sure the decimal places are all lined up. 

Example Question #13 : How To Find Decimal Fractions

Convert  into a simplified fraction. 

Possible Answers:

Correct answer:

Explanation:

Lets place a  under the decimal. We are going to make a fraction. Essentially, it's still the same value. Now, we want a whole number in the numerator and what we do to the numerator is done to the denominator as well. Lets multiply the top by  or move the decimal place  spots to the right. Now we have . This needs to be reduced, so divide by  twice until it can't be reduced any further. The answer should be 

Example Question #12 : How To Find Decimal Fractions

Convert to a fraction. 

Possible Answers:

Correct answer:

Explanation:

First, lets convert the exponent into a fraction. Any negative exponent means it's the reciprocal of the positive exponent. So  means . Now lets multiply it with the . This means  or  or .

Example Question #12 : How To Find Decimal Fractions

Convert  into a fraction. 

Possible Answers:

Correct answer:

Explanation:

Let  be .  

Lets multiply  by . Now we have:

 

Lets subtract this equation with the first one and we get:

 We do this because we want to get rid of the repeating decimals and now we have a simple equation, isolate  and we arrive at the final answer. 

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