Exploring Arithmetic and Geometric Sequences

A single number repeated multiple times

A list of numbers with a specific pattern

A graphical representation of data

A mathematical operation like addition or subtraction

By dividing the previous term

By subtracting a constant from the previous term

By multiplying the previous term by a constant

By adding a constant to the previous term

By dividing the last term by n

By using the formula an = a1 + (n - 1)d

By adding the common difference to the first term n times

By multiplying the first term by n

The difference between any term and the next

The sum of the first and last term

The product of the first two terms

The ratio of any two consecutive terms

A formula that calculates the sum of a sequence

An equation that only applies to geometric sequences

An equation that defines each term based on the previous term

An equation that can predict any term without knowing the previous ones

To identify the pattern of the sequence

To find any term in the sequence without calculating all previous terms

To graph the sequence on a coordinate plane

To define the sequence in terms of itself

Yes, but only if they are infinite

No, they can only increase

Yes, if the common difference is negative

No, because they are defined by addition

The use of addition in arithmetic and subtraction in geometric

The ability to use recursive equations in geometric sequences only

The linear growth in arithmetic and exponential in geometric

The constant ratio in geometric versus the constant difference in arithmetic

The sum of all terms in the sequence

The ratio between any two consecutive terms

The difference between any two consecutive terms

The total number of terms in the sequence

an = a1^n * r

an = a1 + d(n-1)

an = a1 * r^(n-1)

an = a1 / r^(n-1)