Free **Harmonic Sequence Calculator** finds the nth term of harmonic sequence when a = 2, n=8, and d=2 in a fraction of seconds.

a_{n} = `1/(a + (n-1) *d )`

- a
_{n}is the nth term - a is first term
- n is total number of terms
- d is common difference

a = 2

n = 8

d = 2

a_{8} = `1/(a + (n-1) *d )`

a_{8} =`1/(2 + (8-1) *2 )`

**a _{8} = 0.0625**

Go through the detailed steps to calculate the nth term of harmonic sequence when a = 2, n=8, and d=2.

- Note down the input values such as a = 2, n=8, and d=2
- Substitute the values in the nth term of harmonic sequence formula i.e a
_{n}= 1/[a + (n - 1) . d] - Solve the equation to know the given harmonic sequence nth term value.

**1. What is the nth term of the harmonic sequence a = 2, n=8, and d=2?**

The value of the 5th term of the harmonic sequence a = 2, n=8, and d=2 is 0.0625.

**2. What is the formula of the nth term of the harmonic sequence?**

Nth term of Harmonic Progression HP formula is a_{n} = 1/[a + (n - 1)d].

**3. How do you find the nth term of a harmonic sequence a = 2, n=8, and d=2?**

The simple step is place the first term a = 2, total number of terms n = 8 and common difference d = 2 in the formula an = 1/[a + (n - 1)d] i.e a_{5} = 1/[2 + (8 - 1)2] = 0.0625.