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In the context in which it appears, the phrase "avail themselves of" most nearly means
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In the x*y-coordinate system, line k passes through points (-5*m, 0) and (0, 2*m). Which of the following is a possible equation of line k?
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In the x*y-coordinate system, line k has slope $$\frac{1}{2}$$ and passes through point (0, 5). Which of the following points cannot lie on line k?
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Line k is in the rectangular coordinate system. If line k is defined by the equation 3*y = 2*x + 6, and line k intersects the x-axis at point (a,b), then what is the value of a?
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In the x*y-coordinate system, points (2, 9) and (-1, 0) lie on line k. If the point (n, 21) lies on line k, what is the value of n?
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If a triangle in the x*y-coordinate system has vertices at (-2 , -3), (4, -3) and (28, 7), what is the area of the triangle?
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If the line passes through the origin, what is the value of k?
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Point A in the x*y-coordinate system is shown below. Given two other points B (4a, b) and C (2a, 5b), what is the area of triangle ABC in terms of a and b?
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What is the y-intercept of the graph of the equation y=2*|4*x-4|-10?
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What are the x-intercepts of the parabola defined by the equation $$y =2·x^2–8·x –90$$? Indicate all x-intercepts.
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If $$\frac{(3x)}{2}$$ = y, and 2 - 3y = y + 2, then x =
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If 4*x = 14 and x*y = 1 then y =
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If x $$\neq$$ 2.5 and 2*x = |15 - 4*x|, then x =
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If 2*x - y = 10 and $$\frac{x}{y} = 3$$, then x =
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If x is a number such that $$x^2 + 2·x - 24 = 0 and x^2 + 5·x - 6 = 0$$, then x =
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If $$\frac{x}{3} + \frac{x}{4} + 15 = x$$, then x =
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If $$x \neq -2, x \neq 7 and \frac{(x-3)}{(x+2)} =\frac{(x+3)}{(x-7)}$$
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Which of the following is equivalent to If$$2·x^{2}+8·x-24\over2·x^{2}+20·x-48$$ for all values of x for which both expressions are defined?
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If $$x^2 - y^2 = 12$$ and x - y = 4, then x =
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If x is a positive integer and x+2 is divisible by 10, what is the remainder when $$x^2+4·x+9$$ is divided by 10?
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