Predict the perimeter and the length of the diagonal of the square.

Using the app above, measure the perimeter and the length of the diagonal of the square. Record the measurements below.

Describe how close the predictions and measurements are.

[math]\left(100\right)\cdot\left(-0.09\right)[/math]

[math]\left(-7\right)\cdot\left(-1.1\right)[/math]

[math]\left(-7.3\right)\cdot\left(5\right)[/math]

[math]\left(-0.2\right)\cdot\left(-0.3\right)[/math]

Decide which equation represents this story:[br]

What does [math]x[/math] represent in this situation?

Find the solution to the equation you picked above. Explain or show your reasoning.

What does the solution tell you about its situation?

Decide which equation represents this story:

What does [math]x[/math] represent in this situation?

Find the solution to the equation you picked above. Explain or show your reasoning.

What does the solution tell you about its situation?

Decide which equation represents this story:[br]

What does [math]x[/math] represent in this situation?

Find the solution to the equation you picked above. Explain or show your reasoning.

What does the solution tell you about its situation?

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[/img] [math]6x+11=21[/math][br][br]Find the solution to the equation and explain your reasoning.

What is the vertical difference between [math]D[/math] and [math]A[/math]?

Write an expression that represents the vertical distance between [math]B[/math] and [math]C[/math].