1 (a) Find the next term and the nth term in each of the following sequences.(i)4,8,12,16,20,...24next term =nth term=4n final answer[2](ii)-1.-3,-5.-7,-9,...-11next term =--nth term =-2n-1 oe final answer[3](iii) 3. 12, 27, 48. 75...108next term=3 oe...
11 Find the nth term of each sequence.The first one has been done for you.Sequence nth term3,6,9,12,...3n6,12,18,24,...5,8,11,14,...[2] 相关知识点: 试题来源: 解析 6n or 2 x 3n3n + 2 or 2 + 3ne.g.5+(n-1) x 3 oeone correct answer. ...
Find the first four terms of a sequence that has the nth term. a_{n} = 2(n + 1)! Find the first five terms of the sequence whose nth term is given. a: (-2)n + 2n \\b: n^2 - n \\c: |10 - n^2| Find the first five terms ...
Struggling With Sequences And S...? Get Allen’s Free Revision Notes Free ALLEN Notes Text SolutionGenerated By DoubtnutGPT To find the nth term of the series 1+5+18+58+179+…, we will follow these steps: Step 1: Identify the terms of the seriesThe terms of the series are:- T1=1...
The mathematical sequence is the term that follows a certain pattern. Som with the general formula of the mathematical sequence, we can find any term of the sequence. This also helps in finding the sum of all the terms of the sequence using the sigma notation...
百度试题 结果1 题目 The sequence is either arithmetic or geometric. Find a formula for the nth term of each sequence. -2,1,4,7,...\ n=15 相关知识点: 试题来源: 解析 a_n=3n-5 反馈 收藏
百度试题 结果1 题目For each of the following sequences, find: the nth term6,\ 19,\ 48,\ 99,\ 178 相关知识点: 试题来源: 解析 n^3+2n^2+3 反馈 收藏
The 7-th term of the arithmetic sequence is: 23 Explanation: In the above exercise - The "findNthTermArithmetic()" function takes three parameters: x (the first term of the sequence), d (the common difference), and n (the term number to find). ...
nth The Fibonacci sequence is an infinite sequence which has the property that each term starting from the third term onwards is the sum of the previous two terms. The first two terms are generally 1 and 1, but can also be 0 and 1. ...
After you have learned to solve problems with arithmetic and quadratic sequences, you may be asked to solve problems with cubic sequences. As the name implies, cubic sequences rely on powers no higher than 3 to find the next term in the sequence. Dependi