Can anyone give me some examples how to apply Hyperbola graphs to real life experiences? also...
Parabola graphs
exponential graphs
2007-02-14 02:49:27 · 3 answers · asked by ? 2 in Education & Reference ➔ Homework Help
can you explain how your answers relate to the graphs? I'm not the brightest person when it comes to graphing and don't understand anything. About them. I can visulize the graphs themselves, but how do flashlights...fit into the graph I guess, etc. You can also e-m me directly at atta_girl73@yahoo. Thanks everyone for your help!
2007-02-14 03:08:10 · update #1
maybe a tresure hunt made by a math teacher...my 22 year old math book says lenses (glasses) for parabolas, and orbits of planets for parabolas, and for hyperbolas bridge design.
2007-02-14 03:02:13 · answer #1 · answered by willie lwgg 3 · 0⤊ 0⤋
xy = -8 Now we surely p.c. y to be on my own for popular graphing. so we are in a position to divide via x and get: xy = -8 turns into >> y = (-8) / (x) Now any graph with x interior the denominator has a "vertical asymptote" all of us comprehend that's impossible to divide via 0, consequently if x is set to 0 interior the equation we have no answer. THe vertical asymptote is a line at this factor (0) if x = -.0000.....a million, y = +infinity if x = +.0000.....a million, y = -infinity yet as quickly as we make x = -a million we get 8 for an answer [-8 / /-a million] If we make x = +a million we get -8 for an answer [ -8 / a million] WIth the vertical asymptote being 0 and employing those 2 try factors, all of us comprehend the graph occupies the 2nd and 4th quadrant of the coordinate airplane. (-a million, 8) and (a million, -8). You surely would desire to allure to 2 curves one sloping from the factor (-infinity, 0) to (0, +infinity) to occupy the 2nd quadrant and yet another curve from (+infinty, 0) to (0, -infinity) to occupy the fourth quadrant. that might actually assist you, you need to use different try factors... you have already got (a million, -8) and (-a million, 8) [word they're going to constantly be opposites) you need to use different poits like (2, -4) and (-4, 2) additionally (4, -2) and (-4, 2) to help shape the two meditated curves.
2016-10-02 03:13:26 · answer #2 · answered by Anonymous · 0⤊ 0⤋
bridges, flashlights, car's headlights......
http://xahlee.org/SpecialPlaneCurves_dir/Hyperbola_dir/hyperbola.html
http://britton.disted.camosun.bc.ca/jbconics.htm
2007-02-14 03:03:58 · answer #3 · answered by wanna_be_md 3 · 0⤊ 0⤋