Average
MCQs Math

Question:     Find the average of the first 3483 even numbers.

Correct Answer  3484

Solution And Explanation

Explanation

Method to find the average

Step : (1) Find the sum of given numbers

Step: (2) Divide the sum of given number by the number of numbers. This will give the average of the given numbers

The first 3483 even numbers are

2, 4, 6, 8, . . . . 3483 th terms

Calculation of the sum of the first 3483 even numbers

We can find the sum of the first 3483 even numbers by simply adding them, but this is a bit difficult. And if the list is long, it is very difficult to find their sum. So, in such a situation, we will use a formula to find the sum of given numbers that form a particular pattern.

Here, the list of the first 3483 even numbers forms an Arithmetic series

In an Arithmetic Series, the common difference is the same. This means the difference between two consecutive terms are same in an Arithmetic Series.

The sum of n terms of an Arithmetic Series

S_n = ⁿ/₂ [2a + (n – 1) d]

Where, n = number of terms, a = first term, and d = common difference

In the series of the first 3483 even number,

n = 3483, a = 2, and d = 2

Thus, sum of the first 3483 even numbers

S₃₄₈₃ = ³⁴⁸³/₂ [2 × 2 + (3483 – 1) 2]

= ³⁴⁸³/₂ [4 + 3482 × 2]

= ³⁴⁸³/₂ [4 + 6964]

= ³⁴⁸³/₂ × 6968

= ³⁴⁸³/₂ × 6968 3484

= 3483 × 3484 = 12134772

⇒ The sum of the first 3483 even numbers (S₃₄₈₃) = 12134772

Shortcut Method to find the sum of the first n even numbers

Thus, the sum of the first n even numbers = n² + n

Thus, the sum of the first 3483 even numbers

= 3483² + 3483

= 12131289 + 3483 = 12134772

⇒ The sum of the first 3483 even numbers = 12134772

Calculation of the Average of the first 3483 even numbers

Formula to find the Average

Average = ^{Sum of the given numbers}/_{Number of the numbers}

Thus, The average of the first 3483 even numbers

= ^{Sum of the first 3483 even numbers}/₃₄₈₃

= ^12134772/₃₄₈₃ = 3484

Thus, the average of the first 3483 even numbers = 3484 Answer

Shortcut Trick to find the Average of the first n even numbers

(1) The average of the first 2 even numbers

= ^{2 + 4}/₂

= ⁶/₂ = 3

Thus, the average of the first 2 even numbers = 3

(2) The average of the first 3 even numbers

= ^{2 + 4 + 6}/₃

= ¹²/₃ = 4

Thus, the average of the first 3 even numbers = 4

(3) The average of the first 4 even numbers

= ^{2 + 4 + 6 + 8}/₄

= ²⁰/₄ = 5

Thus, the average of the first 4 even numbers = 5

(4) The average of the first 5 even numbers

= ^{2 + 4 + 6 + 8 + 10}/₅

= ³⁰/₅ = 6

Thus, the average of the first 5 even numbers = 6

Thus, the Average of the First n even numbers = n + 1

Thus, the average of the first 3483 even numbers = 3483 + 1 = 3484

Thus, the average of the first 3483 even numbers = 3484 Answer

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