3.05 Geometric sequences with technology

T_{n+1} = 4 T_n,\text{ } T_1 = 0.5

T_{n + 1} = 0.2 T_n,\text{ } T_1 = 25

T_n = 2 T_{n - 1},\text{ } T_5 = 32

T_n = \dfrac{1}{4} T_{n - 1},\text{ } T_5 = \dfrac{1}{4}

\dfrac{T_2}{T_1}

\dfrac{T_3}{T_2}

\dfrac{T_4}{T_3}

T_5

- 9 , - 10.8 , - 12.96 , - 15.552 , \ldots

- 8, -16, -32, -64, \ldots

State the 5th term.

Calculate the sum of the first 5 terms.

Find the value of r, the common ratio in the sequence.

List the first three terms of the geometric progression.

a_1 = 2 and a_{n+1} = 3 a_n

a_1 = 8 and a_n = \dfrac{1}{2} a_{n - 1}

Find the common ratio, r, of this sequence.

Write the recursive rule for T_{n+1} in terms of T_n, including the initial term T_1.

Calculate the sum of the terms between the 4th and 9th term inclusive.

Find the possible values of the common ratio, r, of this sequence.

Write the recursive rule for T_n in terms of T_{n - 1} that uses the positive common ratio, and the initial term T_1.

Write the recursive rule for S_n in terms of S_{n - 1} that uses the positive common ratio, and the initial term S_1.

Determine the sum of the terms between T_4 and T_8 inclusive.

Find the common ratio, r, of this sequence.

Find the first term of this sequence.

Write the recursive rule for T_{n+1} in terms of T_n, including the initial term T_1.

Determine the sum of the terms between the 3rd and 10th term inclusive.

Find the common ratio, r, of this sequence.

Find the first term of this sequence.

Write the recursive rule for T_n in terms of T_{n - 1} that uses the positive common ratio, and the initial term T_1.

Write the recursive rule for S_n in terms of S_{n - 1} that uses the positive common ratio, and the initial term S_1.

Calculate the sum of the first 15 terms of the sequence containing a negative common ratio. Round your answer to the nearest whole number.

Write the recursive rule for T_{n+1} in terms of T_n , including the initial term T_1.

Determine the sum of the first 10 terms. Round your answer to the nearest whole number.

Find the 6th term. Round your answer to three decimal places.

Calculate the sum of the first 6 terms. Round your answer to the nearest whole number.

Write the first four terms of the sequence.

Find the common ratio.

T_n = 3 \times 4^{n - 1}

T_n = - 4 \times \left( - 3 \right)^{n - 1}

Write the general rule for T_n, the nth term of the sequence.

Hence, state the next three terms of the sequence.

Find T_9, the 9th term of the sequence.

Calculate the sum of the first 9 terms. Round your answer to the nearest whole number.

Find the formula for the nth term of the sequence.

Hence, find the next three terms of the sequence.

Determine the value of r

Hence determine the value of a

Write an expression for T_n

Find the value of r.

Hence determine the value of a.

Write an expression for T_n.

Find the the value of b.

Find the three consecutive terms.

State the value of r.

If the sequence starts from n = 1, plot the first four terms on a number plane.

Is the relationship depicted by this graph linear, exponential or neither?

Write the recursive rule for T_{n+1} in terms of T_n, including the initial term T_1.

Find the sum of the first 10 terms. Round your answer to the nearest whole number.

Complete the table of values.

Find the common ratio.

Plot the points in the table that correspond to n = 1, n = 2, n = 3 and n = 4 on a cartesian plane.

State whether the joined points would form a straight line, a wave shaped curve, a parabola, or an exponential curve.

T_n = 2 \times 3^{n - 1}.

T_n = 6 \times \left( - 2 \right)^{n - 1}.

Complete the table of values.

Find the common ratio.

T_n = 25 \times \left(\dfrac{1}{5}\right)^{n - 1}

T_n = - 72 \times \left( - \dfrac{4}{3} \right)^{n - 1}.