Question

divide 69 in three parts such that all parts are in APand product of 2 smaller part will be 483​

Answer 1

Step-by-step explanation:

Let the first term of the AP be 'a'

And the common difference be 'd'

Since 69 split into 3 parts such that they form an AP.

Let the three parts be (a - d), (a) and (a + d).

Therefore,

(a - d) + (a) + (a + d) = 69

3a = 69 

a = 23

The product if two smaller parts = 483

So, 

(a) × (a - d) = 483

23 × (23 - d) = 483

⇒ 529 - 23d = 483

⇒ - 23d = 483 - 529

⇒ - 23 d = - 46

⇒ d = 46/23

⇒ d = 2

Therefore,

The 3 parts are   

23 - 2 = 21 ;

23 

and 23 + 2 = 25

Hence the parts of the given AP are 21, 23, and also 25

Hope you understood