Explicit and Recursive Formulas in Sequences

It is more time-consuming.

It requires less understanding of the sequence.

It is more accurate.

It allows finding specific terms directly.

The previous term and a common difference.

The common ratio of the sequence.

The total number of terms.

The first term of the sequence.

By subtracting the common difference from the first term.

By adding the common difference multiplied by one less than the term number to the first term.

By adding the common difference to the first term.

By multiplying the first term by the common ratio.

f(n) = 7 + 10(n-1)

f(n) = 10(n-1) + 7

f(n) = 10n + 7

f(n) = 7 + 10n

Once

Four times

Twice

Three times

f(n) = 3 * 2^n

f(n) = 6 * 2^(n-1)

f(n) = 3 * 2^(n-1)

f(n) = 3 * n^2

The number of terms in the sequence.

The term number minus one.

The common ratio.

The first term.