Find 5th term of g. P squad of 4375 am 2second term 35
Aside from working with a GP, I have no idea what all the other gibberish means.
ar = 35
P squad ? no idea.
But the 5th term is ar^4 = (ar)r^3 = 35r^3.
Maybe you can either post something intelligible, or finish it off from here.
To find the 5th term of the given sequence, we need to find the pattern or formula that relates the terms. From the information provided, we have the first term (P), the common ratio (r), and the second term (a2).
In the given sequence, the second term (a2) is 35.
Using the formula for the nth term of a geometric sequence: an = a1 * r^(n-1), where a1 is the first term, r is the common ratio, and n is the term number.
Let's substitute the values we have into the formula:
a2 = a1 * r^(2-1)
35 = P * r
Now, we need to find the common ratio (r). To do this, we'll use the given information that the sum of the first two terms is 4375.
P + a2 = 4375
P + 35 = 4375
P = 4375 - 35
P = 4340
Now we have the value of the first term (P) which is 4340 and the common ratio (r), which can be deduced by:
35 = P * r
35 = 4340 * r
r = 35 / 4340
Now we can find the 5th term (a5) using the formula:
a5 = a1 * r^(5-1)
a5 = 4340 * (35 / 4340)^4
Calculating that expression, we get:
a5 = 4340 * (0.0080703)
a5 ≈ 35.01
Therefore, the 5th term of the sequence is approximately 35.01.