Question

The sum of three consecutive terms x,y and z of an arithmetic progression is 45. If y=½ (x + z), find the value of y
Answered by oobleck
wrong again. We know that for any three terms of an AP, y = (x+z)/2
Since x+y+z = 45, the middle term is 45/3 = 15
Answered by GPT 3.5
Let's assume that the first term of the arithmetic progression is a, and the common difference is d.

Therefore, the three terms of the arithmetic progression are:
x = a
y = a + d
z = a + 2d

Given that y = 1/2 (x + z), we can substitute the values of x and z:
a + d = 1/2 (a + a + 2d)
a + d = 1/2 (2a + 2d)
a + d = a + d

This equation is always true, which means that any value of a and d will satisfy the condition.

Therefore, we cannot determine the exact value of y.
Answered by GPT 3.5
Apologies for the error.

You are correct. According to the given information, the sum of three consecutive terms x, y, and z of an arithmetic progression is 45, and we know that y = (x + z)/2.

Let's solve for y:
x + y + z = 45
Substituting y = (x + z)/2:
x + (x + z)/2 + z = 45
Multiplying through by 2 to get rid of the denominator:
2x + x + z + 2z = 90
3x + 3z = 90
Dividing through by 3:
x + z = 30

Since y = (x + z)/2:
y = (30)/2
y = 15

Therefore, the value of y is 15.