- Plot this on the Cartesian Graph:
- Determine the abcissa for (3,4)
- Determine the ordinate for (3,4)
- Determine the quadrant for (3,4)
- The formula for this is below:
- Determine the quadrant for (2.9927,0.2093)
- Transform r:
- Transform θ
- Convert our angle to degrees
- Determine the quadrant for (3,4)
- Show equivalent coordinates
- Method 2: -(r) + 180°
- Method 3: -(r) - 180°
- What 2 formulas are used for the Ordered Pair Calculator?
- What 15 concepts are covered in the Ordered Pair Calculator?
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Plot this on the Cartesian Graph:
Determine the abcissa for (3,4)
Abcissa = absolute value of x-valuePerpendicular distance to the y-axisAbcissa = |3| = 3Determine the ordinate for (3,4)
Ordinate = absolute value of y-valuePerpendicular distance to the x-axisOrdinate = |4| = 4We start at the coordinates (0,0)Since our x coordinate of 3 is positiveWe move up on the graph 3 space(s)Since our y coordinate of 4 is positiveWe move right on the graph 4 space(s)Determine the quadrant for (3,4)
Since 3>0 and 4>0(3,4) is in Quadrant IConvert the point (3,4°) frompolar to Cartesian
The formula for this is below:
Polar Coordinates are (r,θ)Cartesian Coordinates are (x,y)Polar to Cartesian Transformation is(r,θ) → (x,y) = (rcosθ,rsinθ)(r,θ) = (3,4°)(rcosθ,rsinθ) = (3cos(4),3sin(4))(rcosθ,rsinθ) = (3(0.99756405026539),3(0.069756473664546))(rcosθ,rsinθ) = (2.9927,0.2093)(3,4°) = (2.9927,0.2093)Determine the quadrant for (2.9927,0.2093)
Since 2.9927>0 and 0.2093>0(2.9927,0.2093) is in Quadrant IConvert (3,4) to polar
Cartesian Coordinates are denoted as (x,y)Polar Coordinates are denoted as (r,θ)(x,y) = (3,4)
Transform r:
r = ±√x2 + y2r = ±√32 + 42r = ±√9 + 16r = ±√25r = ±5Transform θ
θ = tan-1(y/x)θ = tan-1(4/3)θ = tan-1(1.3333333333333)θradians = 0.92729521800161Convert our angle to degrees
| Angle in Degrees = | Angle in Radians * 180 |
| π |
| θdegrees = | 0.92729521800161 * 180 |
| π |
| θdegrees = | 166.91313924029 |
| π |
Determine the quadrant for (3,4)
Since 3>0 and 4>0(3,4) is in Quadrant IShow equivalent coordinates
We add 360°(3,4° + 360°)(3,364°)(3,4° + 360°)(3,724°)
(3,4° + 360°)(3,1084°)
Method 2: -(r) + 180°
(-1 * 3,4° + 180°)(-3,184°)Method 3: -(r) - 180°
(-1 * 3,4° - 180°)(-3,-176°)If (x,y) is symmetric to the origin:then the point (-x,-y) is also on the graph(-3, -4)If (x,y) is symmetric to the x-axis:then the point (x, -y) is also on the graph(3, -4)If (x,y) is symmetric to the y-axis:then the point (-x, y) is also on the graph(-3, 4)Take (3, 4) and rotate 90 degreesWe call this R90°
The formula for rotating a point 90° is:R90°(x, y) = (-y, x)R90°(3, 4) = (-(4), 3)R90°(3, 4) = (-4, 3)
Take (3, 4) and rotate 180 degreesWe call this R180°
The formula for rotating a point 180° is:R180°(x, y) = (-x, -y)R180°(3, 4) = (-(3), -(4))R180°(3, 4) = (-3, -4)
Take (3, 4) and rotate 270 degreesWe call this R270°
The formula for rotating a point 270° is:R270°(x, y) = (y, -x)R270°(3, 4) = (4, -(3))R270°(3, 4) = (4, -3)
Take (3, 4) and reflect over the originWe call this rorigin
Formula for reflecting over the origin is:rorigin(x, y) = (-x, -y)rorigin(3, 4) = (-(3), -(4))rorigin(3, 4) = (-3, -4)
Take (3, 4) and reflect over the y-axisWe call this ry-axis
Formula for reflecting over the y-axis is:ry-axis(x, y) = (-x, y)ry-axis(3, 4) = (-(3), 4)ry-axis(3, 4) = (-3, 4)
Take (3, 4) and reflect over the x-axisWe call this rx-axis
Formula for reflecting over the x-axis is:rx-axis(x, y) = (x, -y)rx-axis(3, 4) = (3, -(4))rx-axis(3, 4) = (3, -4)
Abcissa = |3| = 3Ordinate = |4| = 4Quadrant = IQuadrant = Ir = ±5θradians = 0.92729521800161(3,4) = (5,53.13°)Quadrant = I
How does the Ordered Pair Calculator work?
Free Ordered Pair Calculator - This calculator handles the following conversions: * Ordered Pair Evaluation and symmetric points including the abcissa and ordinate * Polar coordinates of (r,θ°) to Cartesian coordinates of (x,y) * Cartesian coordinates of (x,y) to Polar coordinates of (r,θ°) * Quadrant (I,II,III,IV) for the point entered. * Equivalent Coordinates of a polar coordinate * Rotate point 90°, 180°, or 270° * reflect point over the x-axis * reflect point over the y-axis * reflect point over the originThis calculator has 1 input.
What 2 formulas are used for the Ordered Pair Calculator?
For more math formulas, check out our Formula Dossier
What 15 concepts are covered in the Ordered Pair Calculator?
- cartesian
- a plane is a coordinate system that specifies each point uniquely by a pair of numerical coordinates, which are the signed distances to the point from two fixed perpendicular oriented lines, measured in the same unit of length
- coordinates
- A set of values that show an exact position
- cos
- cos(θ) is the ratio of the adjacent side of angle θ to the hypotenuse
- degree
- A unit of angle measurement, or a unit of temperature measurement
- ordered pair
- A pair of numbers signifying the location of a point(x, y)
- point
- an exact location in the space, and has no length, width, or thickness
- polar
- a two-dimensional coordinate system in which each point on a plane is determined by a distance from a reference point and an angle from a reference direction
- quadrant
- 1 of 4 sections on the Cartesian graph. Quadrant I: (x, y), Quadrant II (-x, y), Quadrant III, (-x, -y), Quadrant IV (x, -y)
- quadrant
- 1 of 4 sections on the Cartesian graph. Quadrant I: (x, y), Quadrant II (-x, y), Quadrant III, (-x, -y), Quadrant IV (x, -y)
- rectangular
- A 4-sided flat shape with straight sides where all interior angles are right angles (90°).
- reflect
- a flip creating a mirror image of the shape
- rotate
- a motion of a certain space that preserves at least one point.
- sin
- sin(θ) is the ratio of the opposite side of angle θ to the hypotenuse
- x-axis
- the horizontal plane in a Cartesian coordinate system
- y-axis
- the vertical plane in a Cartesian coordinate system