split 207 into 3 parts such that these are in a.p and the product of the 2 smaller parts is 4623
Answers
Answered by
9
Let the three parts be a, a+d , a+2d
As per the question : -
a+ a+d + a+ 2d = 207
3a + 3d = 207
a+ d = 69 .
d= 69 - a
Again;
( a + d ) a =4623
( a + 69 - a) a = 4623
69 a = 4623
a = 67 .
Now , d = 69 - 67 = 2 .
Therefore, 207 can be splitted into 67 , 69 , 71 which are in A. P and has a common difference of 2 ,the product of two smallest numbers among them is 4623 .
hope helped! ^^
As per the question : -
a+ a+d + a+ 2d = 207
3a + 3d = 207
a+ d = 69 .
d= 69 - a
Again;
( a + d ) a =4623
( a + 69 - a) a = 4623
69 a = 4623
a = 67 .
Now , d = 69 - 67 = 2 .
Therefore, 207 can be splitted into 67 , 69 , 71 which are in A. P and has a common difference of 2 ,the product of two smallest numbers among them is 4623 .
hope helped! ^^
Answered by
3
ANSWER IS IN THE IMAGE
Attachments:
Similar questions