Question
Fatima and Tia are loading a refrigerator into the back of a truck. They know they need the ramp to make a 50-degree angle with the ground to reach the truck bed, which is 42 inches from the ground. How long is the ramp?
Option #1: sin 50°=42x=55 inches
sin
50
°
=
42
𝑥
=
55
inches
Option #2: cos 50°=42x=48 inches
cos
50
°
=
42
𝑥
=
48
inches
Option #3: sin 42°=x42=63 inches
sin
42
°
=
𝑥
42
=
63
inches
Option #4: cos 42°=42x=62 inches
Option #1: sin 50°=42x=55 inches
sin
50
°
=
42
𝑥
=
55
inches
Option #2: cos 50°=42x=48 inches
cos
50
°
=
42
𝑥
=
48
inches
Option #3: sin 42°=x42=63 inches
sin
42
°
=
𝑥
42
=
63
inches
Option #4: cos 42°=42x=62 inches
Answers
GPT-4o mini
To find the length of the ramp, we can use trigonometric functions based on the given angle and height of the truck bed. Here, we use the sine function because we have the opposite side (the height of the truck bed) and we want to find the hypotenuse (the length of the ramp).
### Step 1: Use the sine function
The relationship between the angles and the sides in a right triangle can be expressed with the sine function:
\[
\sin(\text{angle}) = \frac{\text{opposite}}{\text{hypotenuse}}
\]
In this case:
- The angle is 50 degrees.
- The opposite side is the height of the truck bed (42 inches).
- The hypotenuse is the length of the ramp (let's call it \( x \)).
### Step 2: Set up the equation
\[
\sin(50^\circ) = \frac{42}{x}
\]
### Step 3: Solve for \( x \)
Rearranging the equation gives us:
\[
x = \frac{42}{\sin(50^\circ)}
\]
### Step 4: Calculate the value
Now we need to calculate \( \sin(50^\circ) \) using a calculator:
\[
\sin(50^\circ) \approx 0.766
\]
Using this value:
\[
x = \frac{42}{0.766} \approx 54.8 \text{ inches}
\]
### Conclusion
The closest answer to the calculated length of the ramp would be approximately 55 inches, which corresponds to:
**Option #1: sin 50°=42/x=55 inches.**
This option is correct.
### Step 1: Use the sine function
The relationship between the angles and the sides in a right triangle can be expressed with the sine function:
\[
\sin(\text{angle}) = \frac{\text{opposite}}{\text{hypotenuse}}
\]
In this case:
- The angle is 50 degrees.
- The opposite side is the height of the truck bed (42 inches).
- The hypotenuse is the length of the ramp (let's call it \( x \)).
### Step 2: Set up the equation
\[
\sin(50^\circ) = \frac{42}{x}
\]
### Step 3: Solve for \( x \)
Rearranging the equation gives us:
\[
x = \frac{42}{\sin(50^\circ)}
\]
### Step 4: Calculate the value
Now we need to calculate \( \sin(50^\circ) \) using a calculator:
\[
\sin(50^\circ) \approx 0.766
\]
Using this value:
\[
x = \frac{42}{0.766} \approx 54.8 \text{ inches}
\]
### Conclusion
The closest answer to the calculated length of the ramp would be approximately 55 inches, which corresponds to:
**Option #1: sin 50°=42/x=55 inches.**
This option is correct.