In a triangle the angle with the smallest measure is always opposite the

Example 2.2.

In \(\triangle FGH, \angle F=48\degree,\) and \(\angle G\) is obtuse. Side \(f\) is 6 feet long. What can you conclude about the other sides?

Solution.

Because \(\angle G\) is greater than \(90\degree\text{,}\) we know that \(\angle F +\angle G\) is greater than \(90\degree + 48\degree = 138\degree\text{,}\) so \(\angle F\) is less than \(180\degree-138\degree = 42\degree.\) Thus, \(\angle H \lt \angle F \lt \angle G,\) and consequently \(h \lt f \lt g\text{.}\) We can conclude that \(h \lt 6\) feet long, and \(g \gt 6\) feet long.

Checkpoint2.3.

In isosceles triangle \(\triangle RST\text{,}\) the vertex angle \(\angle S = 72\degree\text{.}\) Which side is longer, \(s\) or \(t\text{?}\)

Triangle Inequality.

In any triangle, we must have that

\begin{equation*} p+q \gt r \end{equation*}

where \(p, q, \text{and}~ r\) are the lengths of the sides of the triangle.

Example2.4.

Two sides of a triangle have lengths 7 inches and 10 inches, as shown at right. What can you say about the length of the third side?

Solution.

We let \(x\) represent the length of the third side of the triangle. By looking at each side in turn, we can apply the triangle inequality three different ways, to get

\begin{equation*} 7 \lt x+10, ~~~ 10 \lt x+7, ~~~ \text{and} ~~~ x \lt 10+7 \end{equation*}

We solve each of these inequalities to find

\begin{equation*} -3 \lt x, ~~~ 3 \lt x, ~~~ \text{and} ~~~ x \lt 17 \end{equation*}

We already know that \(x \gt -3\) because \(x\) must be positive, but the other two inequalities do give us new information. The third side must be greater than 3 inches but less than 17 inches long.

Checkpoint2.5.

Can you make a triangle with three wooden sticks of lengths 14 feet, 26 feet, and 10 feet? Sketch a picture, and explain why or why not.

Answer.

No, \(10+14\) is not greater than 26.

Pythagorean Theorem.

In a right triangle, if \(c\) stands for the length of the hypotenuse, and the lengths of the two legs are denoted by \(a\) and \(b\text{,}\) then

\begin{equation*} \blert{a^2 + b^2 = c^2} \end{equation*}

Example2.6.

A 25-foot ladder is placed against a wall so that its foot is 7 feet from the base of the wall. How far up the wall does the ladder reach?

Solution.

We make a sketch of the situation, as shown below, and label any known dimensions. We'll call the unknown height \(h\text{.}\)

The ladder forms the hypotenuse of a right triangle, so we can apply the Pythagorean theorem, substituting 25 for \(c\text{,}\) 7 for \(b\text{,}\) and \(h\) for \(a\text{.}\)

\begin{align*} a^2 + b^2 \amp = c^2\\ h^2 + 7^2 \amp = 25^2 \end{align*}

Now solve by extraction of roots:

\begin{align*} h^2 + 49 \amp = 625 \amp\amp \blert{\text{Subtract 49 from both sides.}}\\ h^2 \amp = 576 \amp\amp \blert{\text{Extract roots.}}\\ h \amp = \pm \sqrt{576} \amp\amp \blert{\text{Simplify the radical.}}\\ h \amp = \pm 24 \end{align*}

The height must be a positive number, so the solution \(-24\) does not make sense for this problem. The ladder reaches 24 feet up the wall.

Checkpoint2.7.

A baseball diamond is a square whose sides are 90 feet long. The catcher at home plate sees a runner on first trying to steal second base, and throws the ball to the second-baseman. Find the straight-line distance from home plate to second base.

Answer.

\(90\sqrt{2} \approx 127.3\) feet

Example 2.9.

Delbert is paving a patio in his back yard, and would like to know if the corner at \(C\) is a right angle.

He measures 20 cm along one side from the corner, and 48 cm along the other side, placing pegs \(P\) and \(Q\) at each position, as shown at right. The line joining those two pegs is 52 cm long. Is the corner a right angle?

Solution.

If is a right triangle, then its sides must satisfy \(p^2 + q^2 = c^2\text{.}\) We find

\begin{align*} p^2 + q^2 \amp = 20^2 + 48^2 = 400 + 2304 = 2704\\ c^2 \amp = 52^2 = 2704 \end{align*}

Yes, because \(p^2 + q^2 = c^2\text{,}\) the corner at \(C\) is a right angle.

Checkpoint2.10.

The sides of a triangle measure 15 inches, 25 inches, and 30 inches long. Is the triangle a right triangle?

Algebra Refresher2.2.

1. \(\:6-x \gt 3\)

2. \(\:\dfrac{-3x}{4} \ge -6\)

3. \(\:3x-7 \le -10\)

4. \(\:4-3x \lt 2x+9\)

If \(x \lt 0\text{,}\) which of the following expressions are positive, and which are negative?

5. \(\:-x\)

6. \(\:-(-x)\)

7. \(\:\abs{x}\)

8. \(\:-\abs{x}\)

9. \(\:-\abs{-x}\)

10. \(\:x^{-1}\)

\(\underline{\qquad\qquad\qquad\qquad}\)

Algebra Refresher Answers

1. \(\displaystyle \:x \lt 3\)

2. \(\displaystyle \:x \le 8\)

3. \(\displaystyle \:x \le -1\)

4. \(\displaystyle \:x \gt -1\)

5. Positive

6. Negative

7. Positive

8. Negative

9. Negative

10. Negative

13.

If two sides of a triangle are 6 feet and 10 feet long, what are the largest and smallest possible values for the length of the third side?

14.

Two adjacent sides of a parallelogram are 3 cm and 4 cm long. What are the largest and smallest possible values for the length of the diagonal?

15.

If one of the equal sides of an isosceles triangle is 8 millimeters long, what are the largest and smallest possible values for the length of the base?

16.

The town of Madison is 15 miles from Newton, and 20 miles from Lewis. What are the possible values for the distance from Lewis to Newton?

The size of a TV screen is the length of its diagonal. If the width of a 35-inch TV screen is 28 inches, what is its height?

If a 30-meter pine tree casts a shadow of 30 meters, how far is the tip of the shadow from the top of the tree?

The diagonal of a square is 12 inches long. How long is the side of the square?

The length of a rectangle is twice its width, and its diagonal is meters long. Find the dimensions of the rectangle.

What size rectangle can be inscribed in a circle of radius 30 feet if the length of the rectangle must be three times its width?

What size square can be inscribed inside a circle of radius 8 inches, so that its vertices just touch the circle?

9 in, 16 in, 25 in

12 m, 16 m, 20 m

5 m, 12 m, 13 m

5 ft, 8 ft, 13 ft

\(5^2\) ft, \(8^2\) ft, \(13^2\) ft

\(\sqrt{5}\) ft, \(\sqrt{8}\) ft, \(\sqrt{13}\) ft

33.

Show that the triangle with vertices \((0,0)\text{,}\) \((6,0)\) and \((3,3)\) is an isosceles right triangle, that is, a right triangle with two sides of the same length.

34.

Two opposite vertices of a square are \(A(-9,-5)\) and \(C(3,3)\text{.}\)

1. Find the length of a diagonal of the square.

2. Find the length of the side of the square.

35.

A 24-foot flagpole is being raised by a rope and pulley, as shown in the figure. The loose end of the rope can be secured to a ring on the ground 7 feet from the base of the pole. From the ring to the top of the pulley, how long should the rope be when the flagpole is vertical?

36.

To check whether the corners of a frame are square, carpenters sometimes measure the sides of a triangle, with two sides meeting at the join of the boards. Is the corner shown in the figure square?

Find \(\alpha, \beta\) and \(h\text{.}\)

Find \(\alpha, \beta\) and \(d\text{.}\)

39.

Find the diagonal of a cube of side 8 inches. Hint: Find the diagonal of the base first.

40.

Find the diagonal of a rectangular box whose sides are 6 cm by 8 cm by 10 cm. Hint: Find the diagonal of the base first.

1. The back of Brian's pickup truck is five feet wide and seven feet long. He wants to bring home a 9-foot length of copper pipe. Will it lie flat on the floor of the truck?

2. Find the length of the side of the square.

What is the longest curtain rod that will fit inside a box 60 inches long by 10 inches wide by 4 inches tall?

43.

In this problem, we'll show that any angle inscribed in a semi-circle must be a right angle. The figure shows a triangle inscribed in a unit circle, one side lying on the diameter of the circle and the opposite vertex at point \((p,q)\) on the circle.

1. What are the coordinates of the other two vertices of the triangle? What is the length of the side joining those vertices?

2. Use the distance formula to compute the lengths of the other two sides of the triangle.

3. Show that the sides of the triangle satisfy the Pythagorean theorem, \(a^2 + b^2 = c^2\text{.}\)

44.

There are many proofs of the Pythagorean theorem. Here is a simple visual argument.

1. What is the length of the side of the large square in the figure? Write an expression for its area.

2. Write another expression for the area of the large square by adding the areas of the four right triangles and the smaller central square.

3. Equate your two expressions for the area of the large square, and deduce the Pythagorean theorem.