Dailies Contact Lenses

give me 5 applications of geometry trignometry i real life.(plz answer i atlest 20-30 fr each point)?

about trignometry geometry triangles in daily life plz answer in atleast 1000 words

Public Comments

1. Not doing your homework for you, pal, but work with this: Bridges Any building with a roof The frame on an automobile, truck, etc. Hull of a boat A packing crate Think about it - a 1000 words should come pretty quick. No go do your homework.
2. You are looking for some one to write your home work for you. I will not do that. Here is one hint - housebuilding, especially the roof.
3. architecture contractors a career that involves designing or creating or building new things *************** There are an enormous number of applications of trigonometry. Of particular value is the technique of triangulation which is used in astronomy to measure the distance to nearby stars, in geography to measure distances between landmarks, and in satellite navigation systems. Other fields which make use of trigonometry include astronomy (and hence navigation, on the oceans, in aircraft, and in space), music theory, acoustics, optics, analysis of financial markets, electronics, probability theory, statistics, biology, medical imaging (CAT scans and ultrasound), pharmacy, chemistry, number theory (and hence cryptology), seismology, meteorology, oceanography, many physical sciences, land surveying and geodesy, architecture, phonetics, economics, electrical engineering, mechanical engineering, civil engineering, computer graphics, cartography, crystallography. ****************** Here's one interesting use of geometry. Suppose you want to leave holes in the street, so men can get underneath to fix pipes and electrical cables. When the holes aren't being used, you want to cover them with something very strong, like a heavy metal lid, so cars can drive down the street without being damaged. Of course, if a man is down in the hole, and such a heavy cover falls on him, he's going to get hurt pretty badly. So it would be nice if the lids would fit _on_ the holes, without being able to fit _through_ the holes. It turns out that there is only one possible shape that will work. Can you guess what it is? (If not, take a look at a manhole cover.) Can you see why other shapes won't work? Here is another way that you might use math in your everyday life. Suppose you live in a room that is 8 feet from floor to ceiling, and you want to build a bookshelf on the floor and then raise it to lean against the wall.