A stone arch in a bridge forms a parabola described by the equation y = a(x - h)2 + k, where y is the height in feet of the arch
above the water, x is the horizontal distance from the left end of the arch, a is a constant, and (h, k) is the vertex of the parabola.
Image description
What is the equation that describes the parabola formed by the arch?
Image description
What is the equation that describes the parabola formed by the arch?
2 answers:
Answer:
For anyone who needs the explanation:
The equation that describes the parabola formed by the arch: y = -0.071(x-13)^2 + 12
The Width of the arch 8 ft above the water: 15
Step-by-step explanation:
- <u>The equation of the arch:</u><u> y = a(x - h)^2 + k</u>
- By the picture, we see that the vertex is (13,12). The question states that the vertex is (h,k). So H = 13 and K = 12.
2. <u>Plug values into equation:</u>
- H = 13. K = 12.
- Take another point (besides the vertex) from the picture to plug in for X and Y. We can use (26,0)
- X = 26. Y= 0.
- Now we have: 0 = a(26 - 13)^2 + 12
3. <u>Solve Equation to find "a":</u>
- 0 = a(26-13)^2 +12
- First, simplify (26-13). Then, subtract 12 from both sides
- -12 = a(-13)^2
- Solve (-13)^2. This equals 169.
- -12 = a(169)
- Divide 169 on both sides
- -0.071 = a
4. <u>Now rewrite the equation y = a(x - h)^2 + k:</u>
- a = -0.071
- h = 13
- k = 12
To find the width of the arch when the height is 8 ft:
- <u>Create equation:</u>
- y = height in feet of arch above water. In this case it will be 8 ft. So y = 8.
- 8 = -0.071(x-13)^2 + 12
2. <u>Find "x":</u>
- x = horizontal distance from left end of the arch
- ( "x" will not give the width of the arch yet, but will give the x-value on the right point of the arch, to the right of the vertex when the height(y) = 8 )
- 8 = -0.071(x-13)^2 + 12
- Subtract 12 from both sides: -4 = -0.071(x-13)^2
- Divide -0.071 on both sides: (rounded)56 = (x-13)^2
- <u>Square root property:</u>
- 56 squared = 7.5(rounded to nearest tenth)
- (X-13)^2 <em>squared</em> will cancel out the ^2
- 7.5 = x-13
- Add 13 to both sides: 20.5 = x
3. <u>We found the x-value of the point on the </u><em><u>right</u></em><u> of the arch:</u>
- x = 20.5 and height(y) = 8 : (20.5,8)
4. <u>Find the x-value of the point on the </u><em><u>left</u></em><u> of the arch:</u>
- Both x-values will be an equal distance from the vertex (13,12)
- 20.5 - 13 = 7.5
- So, the <em>right</em> point is 7.5 units to the <em>right</em> of the vertex
- 7.5 units to the <em>left</em> of the vertex: (13 - 7.5) = 5.5
Now we have (5.5, 8) for the <em>left</em> point of the arch, and (20.5,8) for the <em>right </em>point of the arch. To find the width(x), do 20.5 - 5.5 =
<h2>15</h2>Good job!
At 8 feet, the arch is 15 feet wide.
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