Pre calc word problem Parabolic archway

  • Thread starter Thread starter unrealmatt3
  • Start date Start date
  • Tags Tags
    Word problem
AI Thread Summary
The problem involves finding the width of a parabolic archway at ground level, given its vertex height of 12 meters and a width of 8 meters at a height of 10 meters. The equation of the parabola is derived from the vertex, leading to the calculation of the parameter p. By substituting values into the parabolic equation, the width at ground level is determined to be approximately 19.6 meters. The solution process involves using the properties of parabolas and solving for y based on the established equations. The final result confirms the width of the archway at ground level.
unrealmatt3
Messages
2
Reaction score
0

Homework Statement



A Parabolic archway is 12 meters high at the vertex, at a height of 10 meters, the width of the archway is 8 meters. How wide is the archway at ground level?

Homework Equations



given in the picture it has (-4,10) and (4,10) along with vertex (0 ,12)

The Attempt at a Solution


(y- 12)^2 =4p(x - 0)

12 = 4p(0) p = 3 ?? I don't know if i need this

i have a picture but not sure what i need to do
 
Physics news on Phys.org
Hi unrealmatt3, welcome to PF.
Consider vertex as the origin.
The equation of the parabola becomes
y^2 = 4*p*x.
In the first position x = (12 - 10) and y = 4. Find p.
In the second position x = 12. p is known. find y.
2y will give you the required result.
 
hey thank rl.bhat for the welcome.
so i think i got it... first 16=4*P(x) where x=2 therefor P = 2
2nd y^2=4(2)(12)
Y^2 = 96
y=4 \sqrt{6}
then 2y = 19.6 meters
 
That is right.
 

Thread 'Finding the number of ways to arrange identical balls in a circle (3 different colors)'

I tried to combine those 2 formulas but it didn't work. I tried using another case where there are 2 red balls and 2 blue balls only so when combining the formula I got ##\frac{(4-1)!}{2!2!}=\frac{3}{2}## which does not make sense. Is there any formula to calculate cyclic permutation of identical objects or I have to do it by listing all the possibilities? Thanks
View full post »

Thread 'Greatest possible value of a constant in polynomial'

Since ##px^9+q## is the factor, then ##x^9=\frac{-q}{p}## will be one of the roots. Let ##f(x)=27x^{18}+bx^9+70##, then: $$27\left(\frac{-q}{p}\right)^2+b\left(\frac{-q}{p}\right)+70=0$$ $$b=27 \frac{q}{p}+70 \frac{p}{q}$$ $$b=\frac{27q^2+70p^2}{pq}$$ From this expression, it looks like there is no greatest value of ##b## because increasing the value of ##p## and ##q## will also increase the value of ##b##. How to find the greatest value of ##b##? Thanks
View full post »

Similar threads

What is the height of the parabolic arch at a point 1 foot in from the base?
Replies
6
Views
5K
Augmented matrices word problem - tiny issue
Replies
2
Views
2K
MCNP6 Fatal Error : Models required
Replies
7
Views
3K
Finding inverse of a Sin function (problem from Mooculus)
Replies
6
Views
3K
Charlieplexing: LEDs have different brightness
Replies
14
Views
2K
What Is the Equation of a Parabola for a Bridge Needing Specific Dimensions?
Replies
5
Views
13K
MHB Solve Archway/Spire Building | Find Coordinates, Values, & Domain
Replies
1
Views
2K
Solving for the Height and Width of St. Louis Arch: A Calculus Problem
Replies
4
Views
2K
Create Function: Height vs. Time (Bicycle Wheel)
Replies
19
Views
3K
Pole in a corner - Trig word problem
Replies
13
Views
10K

Hot Threads

Recent Insights

Back
Top