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What does slope mean in math?
What is the slope of a line?
How do you calculate slope in math?
How do you know if a line has a slope?
The slope of a line, also known as the gradient is defined as the value of the steepness or the direction of a line in a coordinate plane. Slope can be calculated using different methods, given the equation of a line or the coordinates of points lying on the straight line.
Slope is the change in y values divided by the change in x values. Let's find the slope of the line that goes through the points ( 3, 2) and ( 5, 8) : A coordinate plane. The x-axis runs from 0 to 10 and is scaled by 1. The y-axis runs from 0 to 10 and is scaled by 1. A graph of a line intersects the points (3, 2) and (5, 8).
- why does math have to be so confusing?If you work hard then eventually math won't be as confusing!
- How can the slope value (1/2 or 5) be used in real life, and how can we use it in math? Thanks!It could be used to simulate the steepness of a mountain/hill.
- My dad left to get milk. He never came back :)My mom gets milk every week, and she always comes back! I confuse.
- Genuine question- when will i EVER use this IRL?no but you will for your math class so
- So it doesn't matter then, what numbers you use for slope. What about when they don't give you a gra...You haven't said what information you were given instead of a graph. If you are given two points on the line, you can calculate the slope using the...
- Can somebody tell me how to easily visualized. which slope is steeper?Try to think about it like this, imagine you are running up (positive slope) or down (negative slope) a flight of stairs. If the slope is a larger...
- Is there another way of finding a slope without a graph?It should give you points on the graph, use the formula y2-y1/x2-x1, to find the slope, (y2 a y-coordinate, of one of the point, you are not multip...
In math, the slope describes how steep a straight line is. It is sometimes called the gradient. Equations for Slope. The slope is defined as the "change in y" over the "change in x" of a line. If you pick two points on a line --- (x1,y1) and (x2,y2) --- you can calculate the slope by dividing y2 - y1 over x2 - x1.
Intro to slope. Slope tells us how steep a line is. It's like measuring how quickly a hill goes up or down. We find the slope by seeing how much we go up or down (vertical change) for each step to the right (horizontal change). If a line goes up 2 steps for every 1 step to the right, its slope is 2.
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- Without doing any calculations how do you know that one slope has a higher slope than another line? ...You can know if one slope has a higher slope without calculations because the higher the slope the steeper the line. Great question!
- I don't get slope at all; can somebody explain it to me?it's really simple, dude. basically it's just the rise over the run, which means its the amount that goes up, divided by the amount going sideways....
- Why can't it be 'increase in horizontal/ increase in vertical' or 'run over rise'?It kinda makes no sense as we are measuring the amount of steepness i.e higher the number --> steeper the slope. In your question it is the opposite
- how do I caculate a slopehttps://www.khanacademy.org/math/cc-eighth-grade-math/cc-8th-linear-equations-functions/8th-slope/a/slope-formula <-- Slope formula
- Slope is also y2 - y1 / x2 - x1, right?Yes, that is the slope formula, though it would be better to put these in parentheses and add the m to get m=(y2-y1)/(x2-x1). On a graph, you can c...
Check out this video. Example: Slope from graph. We're given the graph of a line and asked to find its slope. A coordinate plane. The x- and y-axes each scale by one. A graph of a line intersects the points zero, five and four, two. The line appears to go through the points ( 0, 5) and ( 4, 2) . A coordinate plane.
In this example the slope is 3/5 = 0.6. Also called "gradient". Have a play (drag the points): See: Equation of a Straight Line. Slope of a Straight Line. Illustrated definition of Slope: How steep a line is. In this example the slope is 35 0.6 Also called gradient.
Slope is closely related to proportional relationships and unit rate. Use examples like comparing distances traveled over time or cost per item to make these connections clear. This not only reinforces the concept of slope but also ties in with Virginia and common core standards.
