To find the hypotenuse of a right triangle, use the Pythagorean Theorem and plug the leg values in for  and :

This question calls for us to use the Pythagorean Theorem. This theorem has a formula of 

where a and b are the sides of a right triangle, adjacent to the right angle, and c is the hypotenuse.

Given our information 

.

This question calls for us to use the Pythagorean Theorem. This theorem has a formula of 

where a and b are the sides of a right triangle, adjacent to the right angle, and c is the hypotenuse.

Given our information 

.

The Pythagorean Theorem states that for any right triangle with legs  and  and hypotenuse :

.

Applying this to Marcus's steps, we know that .

Expand:

So, . To find , just take the square root:

So, Marcus travels exactly  back to the start.

This is solving for the hypotenuse of a triangle. Using the Pythagorean Theorem, which says that  

Susie walks 30 meters north, then 80 meters west, then 30 meters north again. Thus, she walks 60 meters north and 80 meters west. These two directions are 90 degrees away from one another.

At this point, construct a right triangle with one leg that measures 60 meters and a second leg that is 80 meters.

You can save time by using the 3:4:5 common triangle. 60 and 80 are  and , respectively, making the hypotenuse equal to .

We can solve for the length of the missing hypotenuse by applying the Pythagorean theorem:

Substitute the following known values into the formula and solve for the missing hypotenuse: side .

Susie will walk 100 meters to reach her house.

First, define the sides of the triangle. Because the side lengths are consecutive odd numbers, if we define the shortest side will be as , the next side will be defined as , and the longest side will be defined as . We can then find the perimeter of a triangle using the following formula:

Substitute in the known values and variables.

Subtract 6 from both sides of the equation.

Divide both sides of the equation by 3. 

Solve.

This is not the answer; we need to find the length of the longest side, or . 

Substitute in the calculated value for  and solve.

The longest side of the triangle is 21 centimeters long.

 cannot be the side lengths of a right triangle.  does not equal . Also, special right triangle  and  rules can eliminate all the other choices.

Using Pythagorean Theorem, we can solve for the length of leg x:

x² + 6² = 10²

Now we solve for x:

x² + 36 = 100

x² = 100 – 36

x² = 64

x = 8

Also note that this is proportionally a 3/4/5 right triangle, which is very common. Always look out for a side-to-hypoteneuse ratio of 3/5 or 4/5, or a side-to-side ratio of 3/4, in any right triangle, so that you may solve such triangles rapidly.

Using the pythagorean theorem, 8²=7²+x². Solving for x yields the square root of 15, which is 3.9