Data Analysis - SSAT Elementary Level Quantitative
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Which would make the most sense to use if we were going to measure an oven?
Which would make the most sense to use if we were going to measure an oven?
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An oven is most likely larger ruler could measure because a ruler can only measure up to 12 inches. A yardstick can measure up to 3 feet (or 36 inches), and a meter stick is about the same size as a yardstick.
An oven is most likely larger ruler could measure because a ruler can only measure up to 12 inches. A yardstick can measure up to 3 feet (or 36 inches), and a meter stick is about the same size as a yardstick.
Which would make the most sense to use if we were going to measure a jar?
Which would make the most sense to use if we were going to measure a jar?
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You would use a ruler to measure a jar because a jar is most likely smaller than 12 inches, which is the size of a ruler. All of the other tools will be much larger.
You would use a ruler to measure a jar because a jar is most likely smaller than 12 inches, which is the size of a ruler. All of the other tools will be much larger.
Which would make the most sense to use if we were going to measure a bug?
Which would make the most sense to use if we were going to measure a bug?
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You would use a ruler to measure a bug because a bug is most likely smaller than 12 inches, which is the size of a ruler. All of the other tools will be much larger.
You would use a ruler to measure a bug because a bug is most likely smaller than 12 inches, which is the size of a ruler. All of the other tools will be much larger.
Which would make the most sense to use if we were going to measure a kite?
Which would make the most sense to use if we were going to measure a kite?
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You would want to use a yardstick to measure a kite because a kite is most likely bigger than 12 inches, which is the length of a ruler. However, a kite is normally not bigger than 36 inches, or three feet. Measuring tape is usually used to measure much larger objects.
You would want to use a yardstick to measure a kite because a kite is most likely bigger than 12 inches, which is the length of a ruler. However, a kite is normally not bigger than 36 inches, or three feet. Measuring tape is usually used to measure much larger objects.
Look at the chart below. How many grapes are there?
Look at the chart below. How many grapes are there?
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In the chart, grapes are shown in the last bar. That bar goes up to the number 
, which means there are 
grapes.
In the chart, grapes are shown in the last bar. That bar goes up to the number
Look at the chart below. What is there the least of?
Look at the chart below. What is there the least of?
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There are 
pens, 
pencils, and 
markers. 
is the smallest number, which means there are less pens than pencils or markers.
There are
Look at the chart below. How many pens are there?
Look at the chart below. How many pens are there?
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Pens are show in the first bar. The bar goes up to the number 
which means there are 
pens.
Pens are show in the first bar. The bar goes up to the number
Look at the chart below. How many more oranges are there than apples?
Look at the chart below. How many more oranges are there than apples?
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There are 
oranges and 
apples. To find the difference we subtract.
There are
Look at the chart below. How many pencils are there?
Look at the chart below. How many pencils are there?
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Pencils are show in the middle bar. The bar goes up to the number 
which means there are 
pencils.
Pencils are show in the middle bar. The bar goes up to the number
Find the missing numbers in the set.
Find the missing numbers in the set.
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The pattern in the set is to add three every time. The last number of the set given is 19 so add 3 and get 22. Add 3 again and get 25. Add 3 again and get 28. Thus the answer is
The pattern in the set is to add three every time. The last number of the set given is 19 so add 3 and get 22. Add 3 again and get 25. Add 3 again and get 28. Thus the answer is
What is the missing number in the sequence?
2, 6, __, 54
What is the missing number in the sequence?
2, 6, __, 54
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To find the missing number in the sequence, we need to find the pattern. In this problem, the pattern is multiplying by three! So, to find the missing number, we need to multiply the number before the blank space by 3.
To find the missing number in the sequence, we need to find the pattern. In this problem, the pattern is multiplying by three! So, to find the missing number, we need to multiply the number before the blank space by 3.
Fill in the missing number in the pattern:
Fill in the missing number in the pattern:
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Each number is three greater than the preveious number:
3, 6, 9, 12, 15, 18.
The missing number is 12.
Each number is three greater than the preveious number:
3, 6, 9, 12, 15, 18.
The missing number is 12.
What is the next number in this sequence?
...
What is the next number in this sequence?
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Each entry in the sequence is obtained by adding to the previous entry a number that increases by 1 each time.
To get the next entry, add 7.
Each entry in the sequence is obtained by adding to the previous entry a number that increases by 1 each time.
To get the next entry, add 7.
Find the missing number in the pattern:
Find the missing number in the pattern:
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This is a Fibonacci sequence.
Each number is found by adding the two numbers before it:
1+1=2
1+2=3
2+3=5
5+8=13
8+13=21
1, 1, 2, 3, 5, 8, 13, 21
This is a Fibonacci sequence.
Each number is found by adding the two numbers before it:
1+1=2
1+2=3
2+3=5
5+8=13
8+13=21
1, 1, 2, 3, 5, 8, 13, 21
Complete the set.
Complete the set.
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The set is increasing. To figure out by how much, simply subtract any two numbers in the set, but remember to put the greater number first!
Example: 
Each number in the set increases by 1.1. To find the missing part of this set, add 1.1 to the number just before the blank.
The complete set is: 1.2, 2.3, 3.4, 4.5, 5.6.
The set is increasing. To figure out by how much, simply subtract any two numbers in the set, but remember to put the greater number first!
Example:
Each number in the set increases by 1.1. To find the missing part of this set, add 1.1 to the number just before the blank.
The complete set is: 1.2, 2.3, 3.4, 4.5, 5.6.
Find the missing parts of this set.
Find the missing parts of this set.
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First, you must notice that the set is counting down/backwards. You can solve this problem in two ways.
-
Notice the pattern: the digits in the tens and ones place are the same and are just counting down. Using this pattern, we can guess that the next two numbers will be 33 and 22.
-
You can find the difference between any two numbers in the set. To do this, take any two numbers and subtract, but remember to put the greater number first!
The difference is 11. Each number in the set decreases by 11. To find the missing numbers, subtract 11 from the last known number.
The two missing numbers are 33 and 22.
First, you must notice that the set is counting down/backwards. You can solve this problem in two ways.
-
Notice the pattern: the digits in the tens and ones place are the same and are just counting down. Using this pattern, we can guess that the next two numbers will be 33 and 22.
-
You can find the difference between any two numbers in the set. To do this, take any two numbers and subtract, but remember to put the greater number first!
The difference is 11. Each number in the set decreases by 11. To find the missing numbers, subtract 11 from the last known number.
The two missing numbers are 33 and 22.
What is the next number in the sequence?
What is the next number in the sequence?
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To find the next number in the sequence, we need to find the pattern. In this problem, the pattern is adding by fours! So, to find the next number, we need to add four more to the last number in the given sequence.
To find the next number in the sequence, we need to find the pattern. In this problem, the pattern is adding by fours! So, to find the next number, we need to add four more to the last number in the given sequence.
Find the missing parts of the sequence.
Find the missing parts of the sequence.
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First, you must notice that the set is increasing. When you look at how all the numbers are related, you will notice that this is a “growing” set, meaning the difference between each number in the set is increasing. To figure out by how much, simply subtract any two numbers in the set.
When you subtract the first two numbers in the set, you will get: 
.
If you subtract the next two numbers, you will get: 
.
Then the next two: 
.
Now you can see a pattern. Each number increases by 1, 2, 3, and so on.
To find the missing number in the set, we must add 6 to 21.
Now we can see the complete set.
First, you must notice that the set is increasing. When you look at how all the numbers are related, you will notice that this is a “growing” set, meaning the difference between each number in the set is increasing. To figure out by how much, simply subtract any two numbers in the set.
When you subtract the first two numbers in the set, you will get:
If you subtract the next two numbers, you will get:
Then the next two:
Now you can see a pattern. Each number increases by 1, 2, 3, and so on.
To find the missing number in the set, we must add 6 to 21.
Now we can see the complete set.
Find the missing parts of this set:
27, 36, 45, 54, , , 81
Find the missing parts of this set:
27, 36, 45, 54, , , 81
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First, you must notice that the set is counting up/forwards. When you look at how all the numbers are related, you will notice that these numbers increase by 9, or are multiples of 9. To solve you can add 9 to the last known number and then 9 to the next:
Or you can count by 9 to fill in the missing numbers. The complete set is: 27, 36, 45, 54, 63, 72, 81.
First, you must notice that the set is counting up/forwards. When you look at how all the numbers are related, you will notice that these numbers increase by 9, or are multiples of 9. To solve you can add 9 to the last known number and then 9 to the next:
Or you can count by 9 to fill in the missing numbers. The complete set is: 27, 36, 45, 54, 63, 72, 81.
Find the two missing numbers in the pattern:
Find the two missing numbers in the pattern:
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First, notice that the set is counting up.
The numbers increase by 
each time.
Therefore the correct choice is 
, 
.
First, notice that the set is counting up.
The numbers increase by
Therefore the correct choice is