please show how to get the answer...

w>2

d+6<15

s-1>4

To find the answer to each of the inequalities, we can follow a similar process. Let's break down each inequality and solve them step by step:

1. w > 2:

The inequality states that "w is greater than 2." To find the answer, we need to determine the values of w that satisfy this inequality:

Step 1: Start with the given inequality: w > 2.
Step 2: To isolate w, subtract 2 from both sides: w - 2 > 2 - 2.
Simplifying, we have: w - 2 > 0.
Step 3: The inequality is now simplified to w - 2 > 0. This states that "w - 2 is greater than 0."
Step 4: To solve for w, add 2 to both sides: w - 2 + 2 > 2 + 2.
Simplifying, we have: w > 4.
Step 5: The answer is w > 4, indicating that any value of w greater than 4 would satisfy the original inequality.

Therefore, the solution to w > 2 is w > 4.

2. d + 6 < 15:

The inequality states that "d plus 6 is less than 15." Let's solve it step by step:

Step 1: Start with the given inequality: d + 6 < 15.
Step 2: To isolate d, subtract 6 from both sides: d + 6 - 6 < 15 - 6.
Simplifying, we have: d < 9.
Step 3: The answer is d < 9, indicating that any value of d less than 9 would satisfy the original inequality.

Therefore, the solution to d + 6 < 15 is d < 9.

3. s - 1 > 4:

The inequality states that "s minus 1 is greater than 4." Here's how to solve it:

Step 1: Start with the given inequality: s - 1 > 4.
Step 2: To isolate s, add 1 to both sides: s - 1 + 1 > 4 + 1.
Simplifying, we have: s > 5.
Step 3: The answer is s > 5, indicating that any value of s greater than 5 would satisfy the original inequality.

Therefore, the solution to s - 1 > 4 is s > 5.

By following these steps, you can solve inequalities and determine the answer based on the given conditions.