Mathematics
Grade-4-
Easy
Question
The following has 8 in hundreds place is
- 68942
- 69824
- 69248
- 69482
Hint:
Use the place value chart to check which of the following has 8 in hundreds place.
The correct answer is: 69482
We will place the numbers in the place value chart and then check which of the following has 8 in hundreds place.
![](data:image/png;base64,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)
Clearly, option (b) has 8 in the hundreds place.
So, the correct option is (b) 69824
Related Questions to study
Mathematics
Expanded form of 89,562 is
Expanded form of 89,562 is
MathematicsGrade-4-
Mathematics
The difference of 46210 to 24210
The difference of 46210 to 24210
MathematicsGrade-4-
Mathematics
The number 920 is between the numbers of______.
900<920<1000.
The number 920 is between the numbers of______.
MathematicsGrade-4-
900<920<1000.
Mathematics
The sum of 96,420 and 24,240
Arrange the numbers vertically and add:
Step 1: 0 + 0 = 0
Step 2: 2 + 4 = 6
Step 3: 4 + 2 = 6
Step 4: 6 + 4 = 10 (Take 1 as carry)
Step 5: 9 + 2 + 1 = 12
The desired result is 1,20,660.
The correct option is (c) 1,20,660
The sum of 96,420 and 24,240
MathematicsGrade-4-
Arrange the numbers vertically and add:
Step 1: 0 + 0 = 0
Step 2: 2 + 4 = 6
Step 3: 4 + 2 = 6
Step 4: 6 + 4 = 10 (Take 1 as carry)
Step 5: 9 + 2 + 1 = 12
The desired result is 1,20,660.
The correct option is (c) 1,20,660
Mathematics
The missing number in the pattern of 56,450, 56,500, ____, 56,600, 56,650 is _______
The difference is called the common difference.
The missing number in the pattern of 56,450, 56,500, ____, 56,600, 56,650 is _______
MathematicsGrade-4-
The difference is called the common difference.
Mathematics
The greatest number among the following numbers 95, 656; 94, 657; 89, 900; 99, 200 is___________
The greatest number among the following numbers 95, 656; 94, 657; 89, 900; 99, 200 is___________
MathematicsGrade-4-
Mathematics
The greatest five-digit number that you can make with the digits 9, 6, 8, 7, 2 is
The greatest five-digit number that you can make with the digits 9, 6, 8, 7, 2 is
MathematicsGrade-4-
Mathematics
The value of 5000 × 6 is_________.
The value of 5000 × 6 is_________.
MathematicsGrade-4-
Mathematics
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)
In 76,424 the digit 7 stands for ____ and 4 stands for ____
![](data:image/png;base64,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)
In 76,424 the digit 7 stands for ____ and 4 stands for ____
MathematicsGrade-4-
Mathematics
In 86,497 , ___ is in ten thousands
In 86,497 , ___ is in ten thousands
MathematicsGrade-4-
Mathematics
Put the missing commas in 94656.
Put the missing commas in 94656.
MathematicsGrade-4-
Mathematics
The expanded form of 21,240 is ______.
The expanded form of 21,240 is ______.
MathematicsGrade-4-
Mathematics
Write the standard form of fifty-six thousand and two hundred ten.
Write the standard form of fifty-six thousand and two hundred ten.
MathematicsGrade-4-
Mathematics
The value of 51000 + 21000 is________.
The value of 51000 + 21000 is________.
MathematicsGrade-4-
Mathematics
The smaller number among the following numbers 76,400 (or) 56,740 is________.
The smaller number among the following numbers 76,400 (or) 56,740 is________.
MathematicsGrade-4-