Hard math question need help?
In this problem the road is 7.6 m across. A cable is embedded in the road 156 cm from one side and the road is 9.4 cm thick at this point.
Find the equation of the parabola. find the MAXIMUM height of the road.
(the numbers in this problem may be very small, so your answers may be accurate to 7 decimal places)
If someone can please help me out it would be great, I must know all the necessary steps to completing this problem. Please show me all the steps!
Thanks,
Favorite Answer
y = h – kx^2
Where h is the max height of the road and k is the parabolic constant in question.
I’m going to set up my origin so that it is in the middle of the road. So that when x = 0 is where we will find our maximum height h.
Because of the cable, you are given a point on the parabola that exists where y = 9.4cm and x = (-760cm/2) + 156cm = -224cm.*
* Why? Because we are assuming that the max height is in the middle of the road at the hump and we know that the road is 7.6m across (7.6m = 760cm), then our “0” point is in the middle at 760cm / 2 = 380cm. So in this co-ordinate system, our left edge is at -380cm, so the cable being 156cm from the edge lives at -224cm.
ok:
x1 = -224cm, y1 = 9.4cm
x2 = -380cm, y2 = 0cm
Both of these points fit on the parabola described by:
x1,y1 (-224cm, 9.4cm)
y = h – k(x^2)
9.4 = h – k(-224^2)
9.4 = h – 50176k
h = 9.4 + 50176k
x2,y2 (-380cm,0cm)
0 = h – k(-380^2)
0 = h – 144400k
h = 144400k
So now we have 2 equations and 2 unknowns.
h = 9.4 + 50176k
h = 144400k
Solving for k.
9.4 + 50176k = 144400k
9.4 = 94224k
k = .000099762293
Plugging this value into the formula h = 144400k
h = 14.4056752536cm which is by definition of our parabola’s origins, should be the max height of the parabola.
Please double check the math, but the idea I believe is identifying the generic form of a parabola and then realizing that if you select your origin in the right place that you can identify at least two points that make sense. In this case, the points are where the cable is embedded where you know the height, and the approximation that the edge of the road is at ground zero. Plugging these values into your parabolic equation gives you a 2 equations and 2 unknowns situation where you can solve for the height h and the parabolic constant k.
Hope this helps or if someone can pick up the ball and simplify this explanation.
Good luck!
