Split 207 into three parts such that these are in AP and the product of the two smaller part is 4623.
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Answered by
324
Hi ,
Let ( a - d ) , a , ( a + d ) are three parts are in A.p
according to the problem given ,
a - d + a + a + d = 207
3a = 207
a = 207 / 3
a = 69
product of two smaller parts = 4623
( a - d ) × a = 4623
( 69 - d ) × 69 = 4623
69 - d = 4623/69
69 - d = 1541/23
69 - d = 67
-d = 67 - 69
- d = - 2
d = 2
Therefore ,
required three parts are ,
a - d = 69 - 2 = 67
a = 69
a + d = 69 + 2 = 71
I hope this helps you.
:)
Let ( a - d ) , a , ( a + d ) are three parts are in A.p
according to the problem given ,
a - d + a + a + d = 207
3a = 207
a = 207 / 3
a = 69
product of two smaller parts = 4623
( a - d ) × a = 4623
( 69 - d ) × 69 = 4623
69 - d = 4623/69
69 - d = 1541/23
69 - d = 67
-d = 67 - 69
- d = - 2
d = 2
Therefore ,
required three parts are ,
a - d = 69 - 2 = 67
a = 69
a + d = 69 + 2 = 71
I hope this helps you.
:)
Answered by
80
Heyy ☺
Answer: 67 , 69 , 71
Step-by-step explanation: Given in the attachment provided below .
Hope it helps u
Thanks
@mannat
☺
Attachments:
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