Slope - online puzzles

Slope

In mathematics, the slope or gradient of a line is a number that describes both the direction and the steepness of the line. Slope is often denoted by the letter m; there is no clear answer to the question why the letter m is used for slope, but its earliest use in English appears in O'Brien (1844) who wrote the equation of a straight line as "y = mx + b" and it can also be found in Todhunter (1888) who wrote it as "y = mx + c".Slope is calculated by finding the ratio of the "vertical change" to the "horizontal change" between (any) two distinct points on a line. Sometimes the ratio is expressed as a quotient ("rise over run"), giving the same number for every two distinct points on the same line. A line that is decreasing has a negative "rise". The line may be practical – as set by a road surveyor, or in a diagram that models a road or a roof either as a description or as a plan.

The steepness, incline, or grade of a line is measured by the absolute value of the slope. A slope with a greater absolute value indicates a steeper line. The direction of a line is either increasing, decreasing, horizontal or vertical.

A line is increasing if it goes up from left to right. The slope is positive, i.e.

m

>

0

{\displaystyle m>0}

.

A line is decreasing if it goes down from left to right. The slope is negative, i.e.

m

<

0

{\displaystyle m<0}

.

If a line is horizontal the slope is zero. This is a constant function.

If a line is vertical the slope is undefined (see below).The rise of a road between two points is the difference between the altitude of the road at those two points, say y1 and y2, or in other words, the rise is (y2 − y1) = Δy. For relatively short distances, where the Earth's curvature may be neglected, the run is the difference in distance from a fixed point measured along a level, horizontal line, or in other words, the run is (x2 − x1) = Δx. Here the slope of the road between the two points is simply described as the ratio of the altitude change to the horizontal distance between any two points on the line.

In mathematical language, the slope m of the line is

m

=

y

2

y

1

x

2

x

1

.

{\displaystyle m={\frac {y_{2}-y_{1}}{x_{2}-x_{1}}}.}

The concept of slope applies directly to grades or gradients in geography and civil engineering. Through trigonometry, the slope m of a line is related to its angle of inclination θ by the tangent function

m

=

tan

(

θ

)

{\displaystyle m=\tan(\theta )}

Thus, a 45° rising line has a slope of +1 and a 45° falling line has a slope of −1.

As a generalization of this practical description, the mathematics of differential calculus defines the slope of a curve at a point as the slope of the tangent line at that point. When the curve is given by a series of points in a diagram or in a list of the coordinates of points, the slope may be calculated not at a point but between any two given points. When the curve is given as a continuous function, perhaps as an algebraic expression, then the differential calculus provides rules giving a formula for the slope of the curve at any point in the middle of the curve.

This generalization of the concept of slope allows very complex constructions to be planned and built that go well beyond static structures that are either horizontals or verticals, but can change in time, move in curves, and change depending on the rate of change of other factors. Thereby, the simple idea of slope becomes one of the main basis of the modern world in terms of both technology and the built environment.

Medieval church (Armenia) puzzle online from photoTorres del Paine National Park (Chile) puzzle online from photoLake Walen (Switzerland) puzzle online from photoWindmill in Camuñas (Spain) online puzzleDead trees in Death Valley (Namibia) puzzle online from photoSleigh Ride online puzzleWinter in Pokljuka (Slovenia) online puzzleView of the bend of Crnojevic River (Montenegro) puzzle online from photoRocky Mountains in Colorado (USA) puzzle online from photoWinter landscape online puzzleAsenova Krepost (Bulgaria) online puzzleFall scenic in Ontario (Canada) online puzzlePath towards the Himalayas in Kashmir puzzle online from photoBoat in Kirkjubour (Faroe Islands) puzzle online from photoValley of the Five Polish Lakes in the Tatra Mountains (Poland) online puzzleIruya (Argentina) puzzle online from photoGerlach Peak (Slovakia) puzzle online from photoWaimea Canyon on Hawaii Islands (USA) online puzzleHikers in Tatra Mountains puzzle online from photoCochabamba railway station (Bolivia) online puzzleThe Crystal Mill (USA) puzzle online from photoOdle Massif in South Tirol (Italy) puzzle online from photoMount Everest online puzzleOld cottage in the Dolomites (Italy) online puzzle
Green Tuscany (Italy) online puzzleTraditional white house in the village of Bozhentsi (Bulgaria) puzzle online from photoCrater Lake (USA) online puzzleGoat on an alpine meadow puzzle online from photoRural landscape of Tuscany (Italy) puzzle online from photoFortified church in Biertan (Romania) puzzle online from photoAlpamayo peak (Peru) online puzzleWooden fences in Visby (Sweden) online puzzleSahara Desert puzzle online from photoSunset over a mountain village covered with snow puzzle online from photoCoast on the Jutland Peninsula puzzle online from photoMachu Picchu (Peru) online puzzleBig Almaty Lake (Kazakhstan) puzzle online from photoEl Capitan (USA) puzzle online from photoChalk cliffs on the Baltic Sea (Denmark) puzzle online from photoWinter in a Carpathian village (Romania) online puzzleHairpin roads in the Dolomites (Italy) puzzle online from photoMammoth Hot Springs in Yellowstone Park (USA) puzzle online from photoAyers Rock (Australia) online puzzleSkógafoss waterfall (Iceland) online puzzleMount Fuji puzzle online from photoRoad covered by snow puzzle online from photoLighthouse in Cape Algarve (Portugal) puzzle online from photoCâmara de Lobos on Madeira (Portugal) puzzle online from photo
Copyright 2024 www.epuzzle.info All rights reserved.