The first, option 1, is indeed a linear equation.

A linear equation has a graph which is a straight line. A straight line
is determined by two points.

for the year 1, their allowance is $100
for the year 2, their allowance is $200

Let x = the year number and y = the allowance.

So the line which the graph of the equation goes through
the two points (1,100), and (2,200)

First we find the slope, given by the slope formula 









Now we substitute in the point-slope formula:






So the 9th year their allowance will be found by
substituting x=9, giving an allowance of y=$900.

I can't tell from the wording whether they get an allowance
the 10th year or not, for it says "until they are 18".  Literally
that means the last year they get an allowance is the 9th year.
You'll have to ask your teacher whether they get an allowance on the
10th year or not.  If so it will be $1000.

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However option 2 is NOT a quadratic equation.  It is a geometric
sequence.  The formula for the nth term of a geometric series is



where the nth term is ,  and ,
since it doubles every year.  Substituting these:

For the 9th year, the allowance will be







So the 9th year the allowance will be $1280.
The 10th year it will be







So the 10th year the allowance would be $2560.
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Comment:
Maybe the first one was supposed to be done as
an arithmetic series, which would give you the same
answer as the linear way.  If so post again.  
But option 2 is definitely a geometric sequence
and is not a quadratic.  

Edwin