Arithmetic sequences must have a constant difference between the terms. Four of the answers do not. The others could be arithmetic sequences because they do.

Sequence goes down by 0.2 each time so the difference is -0.2

Substitute n = 9 into the nth term and get U₁₀ = 3 + 4 X 9, so U₁₀ = 39

Substitute n = 8 and 15 in to the general term. The 8th term is 1.5, 15th term is 5, together they sum to 6.5

Using the formula for the nth term, U_n = U₁ + d(n - 1), substitue U₁ = 5 and d = 9

Substitue U₁ = 15 and d = 16 in to the sum formula, or work out that U₁₀ = 159 and use the other formula

Substitue U₁ = 10 and d = -4 in to the sum formula, or work out that U₂₀ = -66 and use the other formula

Work out that the common difference ias added 3 times between the 4th and 7th term and this is +12 all together so d = 4. Subtract the value of d 3 times to get back to the first term.

Work out that the common difference ias added 7 times between the 2nd and 9th term and this is +35 all together so d = 5. Add the value of d once to get from the 9th to 10th terms.

The first sum is 7750 and the second is 9750