Sequences are just ordered elements.
S = a1, a2, a3 ..., an
for example, a sequence S could be: S = {5, 15, -30, 10, -5, 40, 10}
this can also be written as: S = 5, 15, -30, 10, -5, 40, 10
A subsequence of a sequence is where we pick some elements by preserving their relative order, and gaps are allowed in them.
Creating a subsequence is easy. Consider S = 1, 2, 3, 4, 5
now delete some elements, without changing the order of the remaining elements (see example).
for example: if S = 1, 2, 3, 4, 5
(we delete 2, 4)
then S' = 1, 3, 5 is a subsequence of S
and S'' = 1, 5, 3 is not a subsequence of S because the order of 5 and 3 is not preserved
Contiguous subsequences are subsequences that do not have gaps in them. they are somewhat equivalent to subarrays.
Formally, S' is a subsequence of S if S' = ai, ai+1, ai+2 ..., aj-1, aj where 1 <= i <= j <= n, and i and j are both positive integers.
For example: if S = 1, 2, 3, 4, 5, 6, 7
then S' = 4, 5, 6 is a contiguous subsequence.
and S'' = 2, 4, 5, 6 although is a subsequence of S, but is not a contiguous subsequence of S.
(Do not confuse subsequences with sets. This could be because we sometimes use set notations for them (like {}). Sequences have ordered elements. Just some addition to information is that all contiguous subsequences are still subsequences, but not all subsequences are contiguous subsequences.)
Now, the answer to OPs question becomes obvious.
15, -30, 10 is a contiguous subsequence because it is both a subsequence (the subsequence maintains the original relative order of elements) and its elements are contiguous (Here, a2 = 15, a3 = -30, and a4 = 10. The indices/positions are continuous natural numbers). Thus it is a contiguous subsequence.