Junior Cycle Mathematics ALGEBRA - Inequalities: Solve the inequality
$-2

Question

Solve the inequality 
 $-2 < 5x + 3 < 18, x \in \mathbb{R}$.

(i) To solve the compound inequality, we will break it down into two parts:

1. First, solve the left part of the inequality:
   $$ -2 < 5x + 3 $$
   Subtract 3 from both sides:
   $$ -5 < 5x $$
   Now divide both sides by 5:
   $$ -1 < x $$

2. Next, solve the right part of the inequality:
   $$ 5x + 3 < 18 $$
   Subtract 3 from both sides:
   $$ 5x < 15 $$
   Divide both sides by 5:
   $$ x < 3 $$

Combining these results, we have the solution for the combined inequality:
$$ -1 < x < 3 $$

(ii) Graph your solution on the number line below.

(iii) Niamh is in a clothes shop and has a voucher which she must use. The voucher gives a €10 reduction when more than €35 is spent. She also has €50 cash. Write down an inequality in x to show the range of cash she could spend in the shop.

The voucher requires a minimum of €35 to be used. Since Niamh must use her voucher, she must spend a minimum of €35. If she spends this amount, she gets a €10 discount, meaning the minimum she can spend is €25. The maximum amount of cash she can spend is €50, so the range will be:

$$ 25 \leq x \leq 50 $$

(iv) Write down an inequality in y to show the price range of articles she could buy.

As before, the minimum value Niamh can spend is €35. The maximum amount of cash she can spend is €50, and including the discount, the item of clothing could cost up to €60. Thus the range will be:

$$ 35 \leq y \leq 60 $$

Solve the inequality $-2 < 5x + 3 < 18, x \in \mathbb{R}$ - Junior Cycle Mathematics - Question 12 - 2014

Worked Solution & Example Answer:Solve the inequality $-2 < 5x + 3 < 18, x \in \mathbb{R}$ - Junior Cycle Mathematics - Question 12 - 2014

Solve the inequality $-2 < 5x + 3 < 18, x \in \mathbb{R}$

Graph your solution on the number line below.

Write down an inequality in x to show the range of cash she could spend in the shop.

Write down an inequality in y to show the price range of articles she could buy.

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