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x and y are integers such that $$3 < x < 8$$ $$4 < y < 10$$ and $$x + y = 14$$ Find all the possible values of x. - Edexcel - GCSE Maths - Question 11 - 2022 - Paper 3

Question 11

x and y are integers such that $$3 < x < 8$$ $$4 < y < 10$$ and $$x + y = 14$$ Find all the possible values of x.

Worked Solution & Example Answer:x and y are integers such that $$3 < x < 8$$ $$4 < y < 10$$ and $$x + y = 14$$ Find all the possible values of x. - Edexcel - GCSE Maths - Question 11 - 2022 - Paper 3

Step 1

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Answer

From the inequalities, we have the following ranges:

Step 2

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Answer

Now substituting possible values for y into the equation:

If $y = 5$ , then $x + 5 = 14$ gives $x = 9$ (not valid since x must be less than 8).
If $y = 6$ , then $x + 6 = 14$ gives $x = 8$ (not valid since x must be less than 8).
If $y = 7$ , then $x + 7 = 14$ gives $x = 7$ (valid).
If $y = 8$ , then $x + 8 = 14$ gives $x = 6$ (valid).
If $y = 9$ , then $x + 9 = 14$ gives $x = 5$ (valid).

Thus, the possible values of x are 5, 6, and 7.

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