Cinema Surprises

For a children's film, with 3 children per adult and no pensioners, we could have these prices:

Adult Price: £1.75
Children Price: 75p

Adult Price: £2.50
Children Price: 50p

Adult Price: £3.25
Children Price: 25p

The formula I found was:

$n = 1, 2$ or $3$
Adult Price $= 1 + 0.75 \times n$
Children Price $= 1 - 0.25 \times n$

We found a set of prices with only one solution:

£7-adult
£3-pensioners
£0.5-children

We first used trial and error to find out what numbers could work, then we proved it by using a formula.

$7a+3p+0.5c = a+p+c$
$6a+2p = 0.5c$

So:
$7a+3p+6a+2p = 100$
$13a+5p = 100$
$p = 20-\frac{13a}{5}$

$a$ cannot be more than 10 because if we input it in the equation $p = 20-\frac{13a}{5}$, it would give us $p=-6$ and we can't have negative pensioners. So the number that would work would have to be 5 Then we know that the number of adults would be 5 and the number of pensioners would be 7.

So, eventually the answer for the number of people would be: 5 adults, 7 pensioners, and 88 children, and the earnings would be: £35 from adults, £21 from pensioners, and £44 from children.

We found a set of prices that only has one solution:

Adults £6
Pensioners £5
Children £0.50

$a+p+c=100$
$6a+5p+0.5c=100$
$12a+10p+c=200$
$c=200-12a-10p$

Substituting:
$a+p+200-12a-10p=100$
$-11a-9p=-100$
$11a+9p=100$
$11a=100-9p$
$a=\frac{100-9p}{11}$

For $p=5$, we find that $a=5$. If we increase $p$, the next $100-9p$ that is divisible by 11 is negative, so we only have one solution. This is 5 adults, 5 pensioners and 90 children.

Q1
Adult tickets are £5, Pensioners tickets £2.5 and Children tickets £0.5

Adult Children Pensioners
1 6 93
2 12 86
3 18 78

Q2
Adult tickets are £5, Pensioners tickets £2.5 and Children tickets £0.5

$A+C+P = 100$
$5A+0.5C+2.5P = 100 = A+C+P$
$4A+1.5P = 0.5C$

Q3
Prices with only one solution: Adult tickets are £7, Pensioners tickets £3 and Children tickets £0.5.

$A+C+P = 100$
$7A+3P+0.5C = 100 = A+C+P$
$6A+2P = 0.5C$