Assuming you mean 2m2... (2m - 3)(m + 4)
m2+m-90 = (m-9)(m+10) when factored
M=1000 X=10 therefore MX=1010
If y = mx + b, then x = (y-b)/m (for m not equal to zero).
y = mx dy/dx = m The derivative is simply the constant in front of x. Here, we have indicated that to be m.
Assuming you mean 2m2... (2m - 3)(m + 4)
Y = mX + 6 Y - 6 = mX (Y - 6)/X = m ==============If you had values you could get the integer that is m
the answer is: (y-b)/x = m y = mx + b y - b = mx (y-b)/x = m
m2+m-90 = (m-9)(m+10) when factored
Yes. y = mx + c where m and c are non-zero constants.Yes. y = mx + c where m and c are non-zero constants.Yes. y = mx + c where m and c are non-zero constants.Yes. y = mx + c where m and c are non-zero constants.
M=1000 X=10 therefore MX=1010
Given the point P = (a, b) and slope m, the point-slope equation is(y - b) = m*(x - a)y - b = mx - may = mx - ma + bwhich can be re-written asy = mx + (b - ma) which is of the slope-intercept form y = mx + c in which c = b - ma.Given the point P = (a, b) and slope m, the point-slope equation is(y - b) = m*(x - a)y - b = mx - may = mx - ma + bwhich can be re-written asy = mx + (b - ma) which is of the slope-intercept form y = mx + c in which c = b - ma.Given the point P = (a, b) and slope m, the point-slope equation is(y - b) = m*(x - a)y - b = mx - may = mx - ma + bwhich can be re-written asy = mx + (b - ma) which is of the slope-intercept form y = mx + c in which c = b - ma.Given the point P = (a, b) and slope m, the point-slope equation is(y - b) = m*(x - a)y - b = mx - may = mx - ma + bwhich can be re-written asy = mx + (b - ma) which is of the slope-intercept form y = mx + c in which c = b - ma.
If y = mx + b, then x = (y-b)/m (for m not equal to zero).
y = mx dy/dx = m The derivative is simply the constant in front of x. Here, we have indicated that to be m.
m is the gradient or slope of the linear equation y = mx. It is a measure of the change in y for a unit change in x.
y = mx + b y - b = mx (y - b) / x = m (m is the slope, except where x = 0)
\frac{1}{m-2}-1