3 10 101

3 10 101 Verified by Toppr Each term in the series is obtained by adding 1 to the square of the preceding term So missing term 101 2 1 10202 Was this answer helpful

10101 Solution Verified by Toppr Each term in the series is obtained by adding 1 to the square of the preceding term So missing term 101 2 1 10202 Hence option C is the correct 3 3 9 1 10 10 10 100 1 101 101 101 10201 1 10202 Hence option D is correct

3 10 101

3 10 101
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What is ordinal number maths An ordinal number is a number that determines something s rank in an ordered set Ordinal numbers do not stand for value they stand for 3 10 101 A 10101 B 10201 C 10202 D 11012 See answer Advertisement Advertisement sanskriti94 sanskriti94 C 10202 as you can see the series is 3 3 2 1 10 2

The sequence is generated by starting with the number 3 and then multiplying it by 3 and adding 1 to get 10 Then we multiply 10 by 3 and add 1 to get 101 Continuing this To find the missing number in the series we need to identify the pattern in the series Pattern The first number is 3 which is a single digit odd number The second number is 10 which is

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3 10 101 In the above question each term in the series is obtained by adding 1 to the square of the preceding term So missing term 101 1 10202 Instant Answer Step 1 The first term is 3 Show more Show all steps Solved by Verified Expert Breanna Ollech on 09 03 2023 View the full answer Loaded Progress

Each term in the series is obtained by adding 1 to the square of the preceding term So missing term 101 2 1 10202 Solution By Examveda Team Each term in the series is obtained by adding 1 to the square of the preceding term So missing term 101 2 1 10202 This Question Belongs to

The Last Digit Of 1 3 2 3 3 3 10 3 10 Is Maths Real Numbers
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3 10 101 - Solution Verified by Toppr Correct option is D 10202 In the given series 3 3 9 1 10 10 10 100 1 101 101 101 10201 1 10202 Hence option D is correct Was this