Question 1046252
The Fibonacci-type sequence would look like this

2, {{{highlight(4)}}},{{{highlight(6)}}} , 10, {{{highlight(16)}}}, {{{highlight(26)}}},{{{highlight(42)}}},{{{highlight(68)}}}, 110, {{{highlight(178)}}},...


Therefore the seventh term is 42.

Asker, you are right, the sequence in the problem is Fibonacci-TYPE, which requires ADDING the TWO PREVIOUS TERMS TO GET THE NEXT TERM.  
(Although it is NOT the Fibonacci sequence 1,1,2,3, 5, 8, etc..) 


Ignore what the other tutor is saying.


Somebody needs to learn about the English language...