9<11, 18>17 can you make this a real life inequality problem

Sure! Let's take a look at a real-life inequality problem using the given inequalities: 9 < 11 and 18 > 17.

Problem: Comparing the prices of two types of cellphones.

Scenario: You are comparing the prices of two different cellphone models, A and B, in two different stores.

Given information:
- Price of cellphone model A in Store X is $9.
- Price of cellphone model A in Store Y is $11.
- Price of cellphone model B in Store X is $18.
- Price of cellphone model B in Store Y is $17.

Inequality: The price of cellphone model A in Store X is lower than the price of cellphone model A in Store Y, and the price of cellphone model B in Store X is higher than the price of cellphone model B in Store Y.

Mathematical representation:
Let's represent the inequality using variables:
A_X: Price of cellphone model A in Store X
A_Y: Price of cellphone model A in Store Y
B_X: Price of cellphone model B in Store X
B_Y: Price of cellphone model B in Store Y

So, the inequalities can be represented as:
A_X < A_Y (9 < 11)
B_X > B_Y (18 > 17)

By comparing the prices of the cellphone models in the given stores, we can conclude that Model A is cheaper in Store X compared to Store Y, and Model B is more expensive in Store X compared to Store Y.