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About 11892 results. 1294 free access solutions
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Condition |
free/or 0.5$ |
| m68338 | Find a quadratic function with vertex (4, -5) and containing the point (-3, 1). |
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| m68339 | Find a rational function that has vertical asymptotes x = -1 and x = 2 and x-intercept 1-4, 02? |
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| m68340 | Find a rational function that satisfies the given conditions, Answer may very, but try to give the simplest answer possible.
a. Vertical asymptotes x = - 4, x = 5
b. Vertical asymptotes x = - 4, x = 5; horizontal asymptote y = 3/2, x-intercept (- 2, 0)
c. Oblique asymptote y = x - 1 |
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| m68341 | Find a rational function that satisfies the given conditions. Answers may vary, but try to give the simplest answer possible?
a. Vertical asymptotes x = - 2, x = 3
b. Vertical asymptotes x = - 2, x = 3; horizontal asymptote y = 4; x-intercept (- 3, 0) |
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| m68342 | Find a such that f (x) = ax2 - 4x + 3 has a maximum value of 12. |
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| m68343 | Find a system of inequalities with the given graph.
a.
b. |
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| m68355 | Find an equation for a circle satisfying the given conditions.
(a) Center (-7, -1), radius of length 9 / 5
(b) Center (0, 3), diameter of length 5 |
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| m68356 | Find an equation for a circle satisfying the given conditions.
(a) Center: (0, - 4), radius of length 3/2
(b) Center: (- 2, 6), radius of length √13 |
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| m68357 | Find an equation for a circle satisfying the given conditions.
a. Center: (- 2, 4); radius of length 3
b. Center: (0, - 3); diameter of length 7/2 |
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| m68358 | Find an equation for a circle satisfying the given conditions.
(a) Center 12, 32, radius of length 5/3
(b) Center 14, 52, diameter of length 8.2
(c) Center (-1, 4), passes through (3, 7)
(d) Center (6, -5), passes through (1, 7) |
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| m68359 | Find an equation for a circle with center (-5, 2) and radius of length 13. |
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| m68360 | Find an equation of a circle satisfying the given conditions.
(a) Center (-5, 8) with a circumference of 10π units
(b) Center (2, -7) with an area of 36π square units |
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| m68361 | Find an equation of a hyperbola of the type
x2 / b2 - y2 / a2 = 1
That passes through the points (-3, -3√5/2) and (-3 / 2, 0). |
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| m68362 | Find an equation of a hyperbola satisfying the given conditions.
a. Vertices: (3, -8) and (3, -2); asymptotes: y = 3x - 14, y = -3x + 4
b. Vertices: (-9, 4) and (-5, 4); asymptotes: y = 3x + 25, y = -3x - 17 |
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| m68363 | Find an equation of a hyperbola satisfying the given conditions.
a. Vertices: (0, 3) and (0, -3); foci: (0, 5) and (0, -5)
b. Vertices: (1, 0) and (-1, 0); foci: (2, 0) and (-2, 0)
c. Asymptotes: y = 3/2 x, y = - 3/2 x; one vertex: (2, 0) |
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| m68364 | Find an equation of a hyperbola with vertices (-1, 3) and (-1, 7) and e = 4.
The eccentricity of a hyperbola is defined as e = c > a. For a hyperbola, c > a > 0, so e > 1 when e is close to 1, a hyperbola appears to be very narrow as the eccentricity increases, the hyperbola becomes "wider." |
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| m68365 | Find an equation of a hyperbola with vertices (3, 7) and (-3, 7) and e = 5/3.
The eccentricity of a hyperbola is defined as e = c > a. For a hyperbola, c > a > 0, so e > 1 when e is close to 1, a hyperbola appears to be very narrow as the eccentricity increases, the hyperbola becomes "wider." |
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| m68366 | Find an equation of a parabola satisfying the given conditions.
a. Vertex 10, 02, focus 1-3, 02
b. Vertex 10, 02, focus 10, 102
c. Focus 17, 02, directrix x = -7 |
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| m68367 | Find an equation of a parabola with a horizontal axis of symmetry and vertex (-2, 1) and containing the point (-3, 5). |
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| m68368 | Find an equation of an ellipse centered at the origin that passes through the points (1, √3 / 2) and (√3, 1/2). |
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