Question
The missing number in the pattern of 56,450, 56,500, ____, 56,600, 56,650 is _______
- 56,510
- 56,530
- 56,540
- 56,550
Hint:
A sequence in which the difference of two consecutive terms is the same is an arithmetic progression.
The correct answer is: 56,550
We have to find the missing terms.
We have, 56450, 56500, _ , 56600, 56650.
Here, the difference is 50.
So, 56500 + 50 = 56550.
Hence, the correct option is D.
The difference is called the common difference.
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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 ____
In 86,497 , ___ is in ten thousands
In 86,497 , ___ is in ten thousands
Put the missing commas in 94656.
Put the missing commas in 94656.
The expanded form of 21,240 is ______.
The expanded form of 21,240 is ______.
Write the standard form of fifty-six thousand and two hundred ten.
Write the standard form of fifty-six thousand and two hundred ten.
The value of 51000 + 21000 is________.
The value of 51000 + 21000 is________.
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________.
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The missing numbers are________.
We can find the next terms of the sequence by adding the difference to the previous term.
![](data:image/png;base64,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)
The missing numbers are________.
We can find the next terms of the sequence by adding the difference to the previous term.
The digit multiplied by its place value and added together gives the number.
The digit multiplied by its place value and added together gives the number.
Place value of 5 in 69,542 is _____.
The given number is 69,542.
69,542 = 60,000 + 9000 + 500 + 40 + 2
So, place value of 5 in 69,542 is 500.
The correct option is (a) 500
Place value of 5 in 69,542 is _____.
The given number is 69,542.
69,542 = 60,000 + 9000 + 500 + 40 + 2
So, place value of 5 in 69,542 is 500.
The correct option is (a) 500
The number form of twenty thousand nine hundred is_______.
The number form of twenty thousand nine hundred is_______.
88.888 is the _____ digit number.
Decimal is another way of representing fractions.
88.888 is the _____ digit number.
Decimal is another way of representing fractions.