Find nth term of Geometric Sequence a = 5, n = 10, and r =3 easily by taking help of our easy yet handy Geometric Sequence Calculator and get the result 98415 easily.

a_{n} = a * r^{(n-1)}

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

a = 5

n = 10

r = 3

a_{n} = a * r^{(n-1) }

a_{10} = 5*3^{ (10-1) }

**a _{10} = 98415**

Below is the step by step procedure to determine the nth term of Geometric Progression(G.P) a = 5, n = 10, and r =3. Follow this detailed process and arrive at the solution easily.

- Firstly, identify the given terms of the sequence i.e. a = 5, n = 10, and r =3
- Now, substitute the know values in the formula of finding nth term of Geometric Sequence i.e. a
_{n}= a*r^{(n-1)}= a_{5}= 5*3(10-1) - Simplifying further we get the resultant value a
_{5}= 98415

** 1. What is the formula for nth term of Geometric Progression?**

The formula for nth term of Geometric Progression is given by the equation a_{n} = a*r^{(n-1)}

You can find the nth term of Geometric Sequence a = 5, n = 10, and r =3 by substituting in the formula of nth term of G.P i.e. an = a*r^{(n-1)} = a_{5} = 5*3^{(10-1)}

** 3. Where do I find the Detailed Steps for finding the nth term of Geometric Sequence a = 5, n = 10, and r =3?**

You can find the detailed steps for finding the nth term of Geometric Sequence a = 5, n = 10, and r =3 on our page.