Answer:
3, -7, -17, -27, -37, -47
Step-by-step explanation:
Given: First term: a= 3 and Common Difference, d = -10
We need to find the first six term of the sequence.
Formula: [tex]a_n=a+(n-1)d[/tex]
where,
[tex]a_n[/tex] nth term of series
a is first term
n is number of term
d is common difference
For Second term, n=2
[tex]a_2=3+(2-1)(-10) = 3-10=-7[/tex]
For Third term, n=3
[tex]a_3=3+(3-1)(-10) = 3-20=-17[/tex]
For Fourth term, n=4
[tex]a_4=3+(4-1)(-10) = 3-30=-27[/tex]
For Fifth term, n=5
[tex]a_5=3+(5-1)(-10) = 3-40=-37[/tex]
For Sixth term, n=6
[tex]a_6=3+(6-1)(-10) = 3-50=-47[/tex]
Hence, The sequence is 3, -7, -17, -27, -37, -47
