Alex, Blake and Charlie play a computer game - OCR - GCSE Maths - Question 10 - 2021 - Paper 1

According to the information given, the total score of all three players is 618 points:

$n + B + C = 618$
Substituting the expressions for Blake's and Charlie's scores:

$n + (3n - 8) + (3n + 17) = 618$

Combining like terms gives:

$n + 3n - 8 + 3n + 17 = 618$
$7n + 9 = 618$

Subtract 9 from both sides:

$7n = 609$
Now, divide by 7:

n = rac{609}{7} = 87.

Thus, Alex scored 87 points.

Substituting the value of $n$ into Blake's score formula:

$B = 3(87) - 8 = 261 - 8 = 253$.

So, Blake scored 253 points.

Now substituting the value of Blake's score into Charlie's score formula:

$C = 253 + 25 = 278$.

So, Charlie scored 278 points.

To summarize their scores:

• Alex: 87 points
• Blake: 253 points
• Charlie: 278 points.