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What is the nth term in the sequence:
4, 7, 12, 19, 28
Please show working out


Sagot :

The correct answer is n²+3.

Explanation:
We find the first differences between terms:
7-4=3; 12-7=5; 19-12=7; 28-19=9.

Since these are different, this is not linear.

We now find the second differences:
5-3=2; 7-5=2; 9-7=2.

Since these are the same, this sequence is quadratic.
We use (1/2a)n
², where a is the second difference:
(1/2*2)n
²=1n².

We now use the term number of each term for n:
4 is the 1st term; 1*1
²=1.
7 is the 2nd term; 1*2
²=4.
12 is the 3rd term; 1*3
²=9.
19 is the 4th term; 1*4
²=16.
28 is the 5th term: 1*5
²=25.

Now we find the difference between the actual terms of the sequence and the numbers we just found:

4-1=3; 7-4=3; 12-9=3; 19-16=3; 28-25=3.

Since this is constant, the sequence is in the form (1/2a)n
²+d;
in our case, 1n
²+d, and since d=3, 1n²+3.

Answer:

The nth term in the given sequence will be:

[tex]n^2+3[/tex]

Step-by-step explanation:

We are given a sequence as:

4,7,12,19,28,....

Let [tex]a_n[/tex] represents the nth term in the sequence.

i.e. [tex]a_1=4\\\\a_2=7\\\\a_3=12\\\\a_4=19\\\\a_5=28[/tex]

i.e. these terms could also be written as:

[tex]a_1=(1)^2+3\\\\a_2=(2)^2+3=7\\\\a_3=(3)^2+3=12\\\\a_4=(4)^2+3=19\\\\a_5=(5)^2+3=28\\\\.\\.\\.\\.\\.\\.\\.a_n=(n)^2+3=n^2+3[/tex]

Hence the nth term in the given sequence will be:

[tex]n^2+3[/tex]