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Graph Identification
Function Graph Identification
Question | Answer |
---|---|
y = 3x^5 | vertical propeller |
x^2 + y^2 – x – y – 1 = 0 | circle |
2y = x^2 - 4 | parabola (opens up) |
y = (x - 2)^2 + 3 | paraboal (opens up) |
3x^2 + 3y^2 = 2 | circle |
(x + 4)^2 + (y - 2)^2 = 25 | circle (center : (-4,2) radius: 5) |
x/2 = y | line (leans right - slope = 1/2) |
y = 2x + 5 | line (leans right - slope = 2) |
y = - (x - 2)^(1/3) | horizontal propeller |
x/2 + y/3 = 6 | line (x-intercept: (2,0), y-intercept (0,3)) |
y = 3(x + 2)^3 - 4 | vertical propeller |
y = -(3 - x)^(1/2) | shooting star (shoots down and left) |
y = 3x^2 + 6x + 4 | parabola (opens up) |
y = (x - 4)^(1/3) / 2 | horizontal propeller |
y = 3x^(1/3) | horizontal propeller |
x + 10 = 0 | line (vertical) |
y = (2|x| + 4) / 3 | V-shaped graph (opens up) |
y = (2x^2)/(x^2 - 4) | Rational graph (vertical asymptotes @ x = 2 & x = -2) |
3x + 2y + 6 = 0 | line (leans left, slope = -3/2) |
y = x^4 | parabola (opens up) |
y = (3 + x)/(x - 2) | Rational graph (vertical asymptote @ x = 2) |
y = x^(1/3) | horizontal propeller |
y = -3√(2 + 3x) | shooting star (shoots down and to the right) |
y = -√(25 - x^2) | semi circle (bottom half) |
y = (2x)/(x^2 + 4) | Rational graph |
y = 3/x | Rational graph (vertical asymptote @ x = 0) |
y^2 = -x^2 + 3x | Circle |
y= x^2 + 3 | Parabola (Opens up) |
y = √(x + 2) | Shooting star (shoots up and to the right) |
3y = x^3 | Vertical propeller |
y = -x^3 + 4 | Vertical propeller |
y = (-x^2 + 4)/3 | Parabola (opens down) |
y = 2 + √(x) | Shooting Star (shoots up and to the right) |
4x + 5y = 20 | Line (leans left, slope = -4/5) |
y = |x - 2| + 4 | V shaped graph (opens up) |
y = 8 - |x| | V shaped graph (opens down) |
y = √(16 - x^2) | Semi circle (top half) |
y = (x + 2)/10 | line (leans right, slope = 1/10) |
y = (2x)/(x^2 - 4) | Rational graph (vertical asymptotes @ x = 2 & x = -2) |
y = -√(9-x^2) | Semi-circle (bottom half) |
y = (x^2 - 4)/x | Rational Graph (vertical asymptote @ x = 0) |
x^2 + y^2 - 4x + 2y = 7 | Circle |