How many times does the digit 7 appear among the terms of the sequence of consecutive integer numbers 7, 8, 9, ..., 777?

Question

Mathematics

Merritt

9 December, 14:25

How many times does the digit 7 appear among the terms of the sequence of consecutive integer numbers 7, 8, 9, ..., 777?

+3

Answers (2)

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Shania Pennington · Answer 1

234 times

Step-by-step explanation:

Number of times the number 7 appears in a hundred

7 as units digit (07-17-27 ... 97) : 10 times

7 as tens digit (70-71-72 ... 79) : 10 times

20 times the digit 7 appears in first one hundred (0-100)

Let's calculate how many times 7 would be as units or tens in 7 hundreds

20X7 = 140 times digit 7 appears until number 699

Now, from 700 to 777

7 as hundreds digit (700-701-702 ... 777) : 78 times

7 as tens digit (770-771-772 ... 777) : 8 times

7 as units digit (707-717-727 ... 777) : 8 times

78 + 8 + 8 = 94 times the digit 7 appears in the range 700 - 777. Plus 140 times

140 + 94 = 234 times

Tucker Hayden · Answer 2

It appears 234 times

Step-by-step explanation:

For first 6 hundreds i. e, 17-107, 117-207, 217-307, 317-407, 417-507, 517-607, there are 20 sevens for each. Which gives a total of 20*6 = 120 sevens.

The number '7' along with this makes a total of 121 sevens.

From 617-707, there are 28 sevens. TOTAL = 121 + 28 = 149

From 708-716, there are 9 sevens.

Now, from 717-777, we have a total of 76 sevens

Adding these all makes total = 149+9+76 = 234