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Average
Math MCQs


Question :    Find the average of first 30 multiples of 11.


Correct Answer  170.5

Solution & Explanation

Solution

Shortcut method/Trick

Formula to find the average of the first n multiples of a number p
= p + (n – 1) p/2

Here to find the average of the first 30 multiples of 11.

Here, p = 11 and n = 30

Therefore, Average = 11 + (30 – 1) 11/2

= 11 + 29 × 5.5

= 11 + 159.5

= 170.5

Thus, the average of the first 30 multiples of 1 = 170.5 Answer

Alternate method to find the average of the first 30 multiples of 11

Step (1) Find the sum of the first 30 multiples of 11

Step (2)

Divide the sum of the first 30 multiples of 11 by 30 to find the average.

Solution

The first 30 multiples of 11 are

11, 22, 33, . . . .330

These numbers form an Arithmetic Series because the differences between two consecutive numbers are equal.

Here, the first term "a" = 11

And, common difference (d) = 11

And, number of terms = 30

Sum of "n" terms of a Arithmetic Series

Sn = n/2 [2a + (n – 1)d]

Therefore, S30 = 30/2 [2 × 11 + (30 – 1)11]

= 15 [22 + (29 × 11)]

= 15 [22 + 319]

= 15 × 341

= 5115

Average = Sum of given obeservations/Number of observations

Therefore, the Average of the first 30 multiles of 11

= 5115/30 = 170.5

Therefore, the Average of the first 30 multiles of 11 = 170.5 Answer

Second Alternate method to find the average of the first 30 multiples of 11.

The first 30 multiples of 11 are

11, 22, 33, . . . .330

Therefore, the sum of first 30 multiples of 11

= 11 + 22 + . . . + 330

= 11(1 + 2 + 3 + . . . + 30)

= 11 × [30(30 + 1)]/2

[∵ Sum of first n natural numbers = n(n + 1)/2]

= 11 × (30 × 31)/2

= 11 × 930/2

= 11 × 465

= 5115

Average = Sum of given obeservations/Number of observations

Therefore, the Average of the first 30 multiles of 11

= 5115/30 = 170.5

Therefore, the Average of the first 30 multiles of 11 = 170.5 Answer


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