How do you write the first six terms of the sequence a_n=n^2+3?
1 Answer
Explanation:
Method 1 - Direct substitution
a_1 = 1^2+3 = 1+3 = 4
a_2 = 2^2+3 = 4+3 = 7
a_3 = 3^2+3 = 9+3 = 12
a_4 = 4^2+3 = 16+3 = 19
a_5 = 5^2+3 = 25+3 = 28
a_6 = 6^2+3 = 36+3 = 39
Method 2 - Differences
Since the formula is a quadratic one, its coefficients will be determined by the first
Use direct substitution to write down the first
4color(white)(00000)7color(white)(0000)12
Under the gaps between the terms write down the sequence of differences:
4color(white)(00000)7color(white)(0000)12
color(white)(000)3color(white)(00000)5
Under the gap between the two terms, write the difference:
4color(white)(00000)7color(white)(0000)12
color(white)(000)3color(white)(00000)5
color(white)(000000)2
To this last line, add as many copies of the final difference as you would like extra terms of the original sequence:
4color(white)(00000)7color(white)(0000)12
color(white)(000)3color(white)(00000)5
color(white)(000000)2color(white)(00000)color(red)2color(white)(00000)color(red)2color(white)(00000)color(red)(2)
Fill in extra terms on the line above by adding the differences:
4color(white)(00000)7color(white)(0000)12
color(white)(000)3color(white)(00000)5color(white)(00000)color(red)(7)color(white)(00000)color(red)(9)color(white)(0000)color(red)(11)
color(white)(000000)2color(white)(00000)color(red)(2)color(white)(00000)color(red)(2)color(white)(00000)color(red)(2)
Fill in extra terms on the line above by adding the differences:
4color(white)(00000)7color(white)(0000)12color(white)(0000)color(red)(19)color(white)(0000)color(red)(28)color(white)(0000)color(red)(39)
color(white)(000)3color(white)(00000)5color(white)(00000)color(red)(7)color(white)(00000)color(red)(9)color(white)(0000)color(red)(11)
color(white)(000000)2color(white)(00000)color(red)(2)color(white)(00000)color(red)(2)color(white)(00000)color(red)(2)
