Finding the point that lies on the line described by the equation y - 8 - 3x - 6 can be easily found. Plug in the appropriate (x,y) values, one at a time, and you will find the value for the variable you did not plug in/
No, I can't.
i am cute
Substitute the coordinates of the point into the equation of the line. If the result is true, then the point is on the line.
You will need to plot your first point on the y-intercept which in this equation is -10. From there you will need to use the slope, which in this equation is "x" to tell you to rise 1 and move over 1. You will find the graphed line below.
The x and y coordinates
No, I can't.
i am cute
Substitute the coordinates of the point into the equation of the line. If the result is true, then the point is on the line.
Use point-slope formula
Yes if it is a straight line equation
Stefan's equation states that the expected thickness of ice is proportional to the square root of the number of degree-days (degrees below the freezing point).There is not enough information here; not only is the proportionality factor missing (which we could probably find online), but the formula also requires the number of days. Note that the temperatures would have to be BELOW the freezing point.
You will need to plot your first point on the y-intercept which in this equation is -10. From there you will need to use the slope, which in this equation is "x" to tell you to rise 1 and move over 1. You will find the graphed line below.
The x and y coordinates
Yes if it is a straight line equation
If given simply the slope of a line and a point through which it passes, and then told to find the equation of the line, one of the easiest ways of doing so is to use the point-slope formula.
If given simply the slope of a line and a point through which it passes, and then told to find the equation of the line, one of the easiest ways of doing so is to use the point-slope formula.
If given simply the slope of a line and a point through which it passes, and then told to find the equation of the line, one of the easiest ways of doing so is to use the point-slope formula.