Line + equation - practice problems
Number of problems found: 125
- Parametric equation
Find the parametric equation of a line with y-intercept (0,-4) and a slope of -2. - The midpoint
The midpoint of (2, 5) and (8, y) is (5, -1). Find the line equation in slope-intercept form. - Perpendicular
Find the slope of the line perpendicular to the line p: y = 8x +6. - Y-intercept
Find the y-intercept of the graph (-3,-3), (4,3), (8,3). The x-intercept is 1/2. - Linear function
What is the equation of linear function passing through points: a) A (0,3), B (3,0) b) A (-2,-6), B (3,4) - Parametric 82072
Convert the parametric expression of the straight line to a general equation. x=3-5t y=-4+10t - X intercept
Given: 3y+2x=-6 Calculate the X-intercept. - Using
Using the point-slope equation, find the equation containing (-7, 3) and slope m = -4 - Supplementary angles
One of the supplementary angles is three times larger than the other. What size is larger of supplementary angles? - Line equation:
Line equation: y-3=8/9(x-5) Solve for slope - A function
A function follows the rule "y is 3 less than half of x". Express y as a function of x in the form of an equation. - Line slope
What is the slope of the line with points (-1,-3) and (-5, 2)? - Number line
Find a number on the number line whose distance from the number 3 is four times smaller than from the number 15 (specify both solutions). - Parametric equations
Write the parametric equations of height hc in triangle ABC: A = [5; 6], B = [- 2; 4], C = [6; -1] - Slope
What is the slope of the line defined by the equation -2x +3y = -1? - Specify 5462
P (x) = 15x- (5x + 10,000) specify x so that P (x) = 0 - The tangent of the hyperbola
Write the equation of the tangent of the hyperbola 9x²−4y²=36 at the point T =[t1,4]. - A linear
A linear function has a y-intercept of -12 and a slope of 3/2. What is the equation of the line? - Supplementary angles
One of the supplementary angles is larger by 33° than the second one. Calculate the angle size. - Ladder
A 4 m long ladder touches the cube 1mx1m at the wall. How high reach on the wall?
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