math: Difference between revisions
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(Added atan_r example and fixed arguments for function.) |
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|usage= | |usage= | ||
< | <syntaxhighlight lang="mtmacro" line> | ||
Numbers: | Numbers: | ||
[r:val = math.pi()] | [r:val = math.pi()] | ||
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[r:val = math.mod(dividend, divisor)] | [r:val = math.mod(dividend, divisor)] | ||
</ | </syntaxhighlight> | ||
|examples=<nowiki></nowiki> | |examples=<nowiki></nowiki> | ||
====abs==== | ====abs==== | ||
< | <syntaxhighlight lang="mtmacro" line> | ||
[r:val = math.abs(-3)] | [r:val = math.abs(-3)] | ||
</ | </syntaxhighlight> | ||
Returns: 3.0 | Returns: 3.0 | ||
====atan2_r==== | ====atan2_r==== | ||
< | <syntaxhighlight lang="mtmacro" line> | ||
<!-- getFacingToTarget(sourceId,targetId,degreeRound): facing | |||
sourceId - tokenId of source | |||
targetId - tokenId of target | |||
degreeRound - (opt) round to the nearest degree increment, defaults to 1 | |||
Return the facing from a source token to a target token, center to center | |||
--> | |||
[H: sourceId = arg(0)] | |||
[H: targetId = arg(1)] | |||
[H, if(argCount() >= 3): degreeRound = arg(2); degreeRound = 1] | |||
<!-- calculate angle from center of source to center of target --> | <!-- calculate angle from center of source to center of target --> | ||
[H: x1 = getTokenX(1,sourceId) + getTokenWidth(sourceId)] | [H: x1 = getTokenX(1,sourceId) + round(getTokenWidth(sourceId)/2)] | ||
[H: y1 = getTokenY(1,sourceId) + | [H: y1 = getTokenY(1,sourceId) + round(getTokenHeight(sourceId)/2)] | ||
[H: x2 = getTokenX(1,targetId) + getTokenWidth(targetId)] | [H: x2 = getTokenX(1,targetId) + round(getTokenWidth(targetId)/2)] | ||
[H: y2 = getTokenY(1,targetId) + | [H: y2 = getTokenY(1,targetId) + round(getTokenHeight(targetId)/2)] | ||
[H, if(x1 == x2): direction = 90 * min(1,max(-1,y1-y2)); direction = math.atan2_r((y1-y2),(x2-x1)) / Math.pi() * 180] | |||
[H, if(x1 == x2): direction = 90 * min(1,max(-1,y1-y2)); direction = math.atan2_r(y1-y2,x2-x1) / | [H: facing = degreeRound * round(direction/degreeRound)] | ||
[H: facing = round(direction)] | [H: macro.return = facing] | ||
</ | </syntaxhighlight> | ||
Output range from -179 to 180 degrees. | Output range from -179 to 180 degrees. | ||
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Returns the result of the modulo operation between the two numbers, which represents the remainder after a division operation. | Returns the result of the modulo operation between the two numbers, which represents the remainder after a division operation. | ||
< | <syntaxhighlight lang="mtmacro" line> | ||
[r: math.mod(14,6)] | [r: math.mod(14,6)] | ||
</ | </syntaxhighlight> | ||
Returns 2 | Returns 2 | ||
< | <syntaxhighlight lang="mtmacro" line> | ||
[r: math.mod(10,5)] | [r: math.mod(10,5)] | ||
</ | </syntaxhighlight> | ||
Returns 0 | Returns 0 | ||
< | <syntaxhighlight lang="mtmacro" line> | ||
[r: math.mod(-13,4)] | [r: math.mod(-13,4)] | ||
</ | </syntaxhighlight> | ||
Returns -1 | Returns -1 | ||
====pow==== | ====pow==== | ||
< | <syntaxhighlight lang="mtmacro" line> | ||
[r:val = math.pow(2,3)] | [r:val = math.pow(2,3)] | ||
</ | </syntaxhighlight> | ||
Returns: 8.0 | Returns: 8.0 | ||
|also= | |also= | ||
Latest revision as of 03:25, 17 April 2024
math() Function
• Introduced in version 1.4.0.5
This is NOT a single MapTool function but a collection of math functions in MapTool.
Important Note: Some of these functions have similar versions that don't have the math. prefix. These functions may differ slightly from those in implementation and output. For instance, most of these functions return a floating-point number (e.g.: 3.0), so you may find it helpful to surround them with round(), floor(), or ceiling().
Usage
Numbers:
[r:val = math.pi()]
[r:val = math.e()]
Trigonomotry:
[r:val = math.acos(degrees)]
[r:val = math.acos_r(radians)]
[r:val = math.asin(degrees)]
[r:val = math.asin_r(radians)]
[r:val = math.atan(degrees)]
[r:val = math.atan_r(num)] <!-- radians -->
[r:val = math.atan2(y,x)] <!-- degrees -->
[r:val = math.atan2_r(y,x)] <!-- radians -->
[r:val = math.cos(degrees)]
[r:val = math.cos_r(num)]
[r:val = math.sin(degrees)]
[r:val = math.sin_r(num)]
[r:val = math.tan(degrees)]
[r:val = math.tan_r(num)]
[r:val = math.toDegrees(num)]
[r:val = math.toRadians(degrees)]
Power and root:
[r:val = math.sqrt(num)]
[r:val = math.squareroot(num)]
[r:val = math.cbrt(num)]
[r:val = math.cuberoot(num)]
[r:val = math.pow(num1,num2)]
Logarithmic
[r:val = math.log(num)] (this is the log to base e)
[r:val = math.log10(num)]
Pythagorean:
[r:val = math.hypot(num1, num2)]
[r:val = math.hypotenuse(num1, num2)]
Simple operations
[r:val = math.abs(num)]
[r:val = math.ceil(num)]
[r:val = math.floor(num)]
[r:val = math.isEven(num)]
[r:val = math.isInt(num)]
[r:val = math.isOdd(num)]
[r:val = math.max(num1, num2, num2, etc.)]
[r:val = math.min(num1, num2, num2, etc.)]
[r:val = math.mod(dividend, divisor)]Examples
abs
[r:val = math.abs(-3)]Returns: 3.0
atan2_r
<!-- getFacingToTarget(sourceId,targetId,degreeRound): facing
sourceId - tokenId of source
targetId - tokenId of target
degreeRound - (opt) round to the nearest degree increment, defaults to 1
Return the facing from a source token to a target token, center to center
-->
[H: sourceId = arg(0)]
[H: targetId = arg(1)]
[H, if(argCount() >= 3): degreeRound = arg(2); degreeRound = 1]
<!-- calculate angle from center of source to center of target -->
[H: x1 = getTokenX(1,sourceId) + round(getTokenWidth(sourceId)/2)]
[H: y1 = getTokenY(1,sourceId) + round(getTokenHeight(sourceId)/2)]
[H: x2 = getTokenX(1,targetId) + round(getTokenWidth(targetId)/2)]
[H: y2 = getTokenY(1,targetId) + round(getTokenHeight(targetId)/2)]
[H, if(x1 == x2): direction = 90 * min(1,max(-1,y1-y2)); direction = math.atan2_r((y1-y2),(x2-x1)) / Math.pi() * 180]
[H: facing = degreeRound * round(direction/degreeRound)]
[H: macro.return = facing]Output range from -179 to 180 degrees.
mod
Returns the result of the modulo operation between the two numbers, which represents the remainder after a division operation.
[r: math.mod(14,6)]Returns 2
[r: math.mod(10,5)]Returns 0
[r: math.mod(-13,4)]Returns -1
pow
[r:val = math.pow(2,3)]