Average
Math MCQs

Question :    Find the average of even numbers from 4 to 1696

Correct Answer  850

Solution & Explanation

Solution

Method (1) to find the average of the even numbers from 4 to 1696

Shortcut Trick to find the average of the given continuous even numbers

The even numbers from 4 to 1696 are

4, 6, 8, . . . . 1696

After observing the above list of the even numbers from 4 to 1696 we find that the difference between two consecutive terms are equal. This means the list of the even numbers from 4 to 1696 form an Arithmetic Series.

In the Arithmetic Series of the even numbers from 4 to 1696

The First Term (a) = 4

The Common Difference (d) = 2

And the last term (ℓ) = 1696

The average of the numbers forming an Arithmetic Series

= ^{The first term (a) + The last term (ℓ)}/₂

⇒ The average of numbers forming an Arithmetic Series = ^{a + ℓ}/₂

Thus, the average of the even numbers from 4 to 1696

= ^{4 + 1696}/₂

= ¹⁷⁰⁰/₂ = 850

Thus, the average of the even numbers from 4 to 1696 = 850 Answer

Method (2) to find the average of the even numbers from 4 to 1696

Finding the average of given continuous even numbers after finding their sum

The even numbers from 4 to 1696 are

4, 6, 8, . . . . 1696

The even numbers from 4 to 1696 form an Arithmetic Series in which

The First Term (a) = 4

The Common Difference (d) = 2

And the last term (ℓ) = 1696

The Average of the given numbers

= ^{Sum of the given numbers}/_{Total number of given numbers}

Thus, to find the average of the given numbers, first, we need to find their sum and the total number of given numbers

Finding the number of terms

For an Arithmetic Series, the n^th term

a_n = a + (n – 1) d

Where

a = First term

d = Common difference

n = number of terms

a_n = n^th term

Thus, for the given series of the even numbers from 4 to 1696

1696 = 4 + (n – 1) × 2

⇒ 1696 = 4 + 2 n – 2

⇒ 1696 = 4 – 2 + 2 n

⇒ 1696 = 2 + 2 n

After transposing 2 to LHS

⇒ 1696 – 2 = 2 n

⇒ 1694 = 2 n

After rearranging the above expression

⇒ 2 n = 1694

After transposing 2 to RHS

⇒ n = ¹⁶⁹⁴/₂

⇒ n = 847

Thus, the number of terms of even numbers from 4 to 1696 = 847

This means 1696 is the 847^th term.

Finding the sum of the given even numbers from 4 to 1696

The sum of all terms (S) in an Arithmetic Series

= ⁿ/₂ (a + ℓ)

Where, n = number of terms

a = First term

And, ℓ = Last term

Thus, the sum of all terms (S) of the given even numbers from 4 to 1696

= ⁸⁴⁷/₂ (4 + 1696)

= ⁸⁴⁷/₂ × 1700

= ^{847 × 1700}/₂

= ^1439900/₂ = 719950

Thus, the sum of all terms of the given even numbers from 4 to 1696 = 719950

And, the total number of terms = 847

Since, the average of the given numbers

= ^{Sum of the given numbers}/_{Total number of given numbers}

Thus, the average of the given even numbers from 4 to 1696

= ⁷¹⁹⁹⁵⁰/₈₄₇ = 850

Thus, the average of the given even numbers from 4 to 1696 = 850 Answer

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