Mathematics
Grade-2
Easy
Question
Find the partial sum of the given place value block.
![](data:image/png;base64,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)
- 37 & 22
- 5 & 9
- 50 & 9
- 30 & 20
Hint:
Use partial sum method by obtaining the ten's and one's from the given figure.
The correct answer is: 50 & 9
Given That:
![](data:image/png;base64,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)
>>> Tens: 30 + 20 = 50
>>> Ones: 7 + 2 = 9
>>> So, the partial sum of the given place value block is 50 & 9.
>>> Tens: 30 + 20 = 50
>>> Ones: 7 + 2 = 9
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Write missing tens or ones digit. 42 + 3⎕ = 75
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Mathematics
Write an equation for the sum given below:
![](data:image/png;base64,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)
Write an equation for the sum given below:
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
When asked about favorite sport, 15 students like to play soccer and 19 students like to play tee-ball. How many students are there in all?
When asked about favorite sport, 15 students like to play soccer and 19 students like to play tee-ball. How many students are there in all?
MathematicsGrade-2
Mathematics
Ted has 18 crayons. Terry has 47 crayons. How many crayons does they have in all?
Ted has 18 crayons. Terry has 47 crayons. How many crayons does they have in all?
MathematicsGrade-2
Mathematics
Ben has 24 stamps. He buys 46 stamps more from a store. How many stamps does he have now?
Ben has 24 stamps. He buys 46 stamps more from a store. How many stamps does he have now?
MathematicsGrade-2
Mathematics
Wendy collects 32 rocks. His sister collects 29 rocks. How many rocks do they collect in all?
Wendy collects 32 rocks. His sister collects 29 rocks. How many rocks do they collect in all?
MathematicsGrade-2
Mathematics
Find 36 + 40
Find 36 + 40
MathematicsGrade-2
Mathematics
Use partial sums to find the sum of 47 and 29.
Use partial sums to find the sum of 47 and 29.
MathematicsGrade-2
Mathematics
Find the partial sums of 28 + 14.
Find the partial sums of 28 + 14.
MathematicsGrade-2
Mathematics
Represent an equation for below sum.
![](data:image/png;base64,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)
Represent an equation for below sum.
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
Roger puts 8 pennies to his bank. Then he added 7 pennies and 25 pennies to his bank. How many pennies does he have in all?
Roger puts 8 pennies to his bank. Then he added 7 pennies and 25 pennies to his bank. How many pennies does he have in all?
MathematicsGrade-2
Mathematics
Write missing tens or ones digit. 19 + ⎕1 = 60
Write missing tens or ones digit. 19 + ⎕1 = 60
MathematicsGrade-2
Mathematics
Joel has 27 toys which are in blue in color and 31 toys which are in green in color. How many toys does Joel have in all?
Joel has 27 toys which are in blue in color and 31 toys which are in green in color. How many toys does Joel have in all?
MathematicsGrade-2
Mathematics
Ryan has 59 stickers. Kai has 34 stickers. How many stickers do they have in all?
Ryan has 59 stickers. Kai has 34 stickers. How many stickers do they have in all?
MathematicsGrade-2