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DO NOT EDIT THE CONTENT OF THIS PAGE DIRECTLY, UNLESS YOU KNOW WHAT YOU'RE DOING.
		THE STRUCTURE OF THE CONTENT IS VITAL IN BEING ABLE TO EXTRACT CHANGES FROM THE PAGE AND MERGE THEM BACK INTO SERVOY SOURCE{hidden}
{sub-section:description|text=}{sub-section}\\ 

{table:class=servoy sSummery}{colgroup}{column:width=80px}{column}{column}{column}{colgroup}{tr:style=height: 30px;}{th:colspan=2}Method Summary{th}{tr}{tbody}{tr}{td}void{td}{td}[#addPolynomial]\(polynomial)
Adds another polynomial to this polynomial.{td}{tr}{tbody}{tbody}{tr}{td}void{td}{td}[#addTerm]\(coefficient, exponent)
Adds a term to this polynomial.{td}{tr}{tbody}{tbody}{tr}{td}[Number]{td}{td}[#findRoot]\(startValue, error, iterations)
Finds a root of this polynomial using Newton's method, starting from an initial search value, and with a given precision.{td}{tr}{tbody}{tbody}{tr}{td}[Polynomial]{td}{td}[#getDerivative]\()
Returns a polynomial that holds the derivative of this polynomial.{td}{tr}{tbody}{tbody}{tr}{td}[Number]{td}{td}[#getDerivativeValue]\(x)
Returns the value of the derivative of this polynomial in a certain point.{td}{tr}{tbody}{tbody}{tr}{td}[Number]{td}{td}[#getValue]\(x)
Returns the value of this polynomial in a certain point.{td}{tr}{tbody}{tbody}{tr}{td}void{td}{td}[#multiplyByPolynomial]\(polynomial)
Multiplies this polynomial with another polynomial.{td}{tr}{tbody}{tbody}{tr}{td}void{td}{td}[#multiplyByTerm]\(coefficient, exponent)
Multiples this polynomial with a term.{td}{tr}{tbody}{tbody}{tr}{td}void{td}{td}[#setToZero]\()
Sets this polynomial to zero.{td}{tr}{tbody}{table}\\ 

{table:class=servoy sDetail}{colgroup}{column:width=100%}{column}{colgroup}{tr:style=height: 30px;}{th:colspan=1}Method Details{th}{tr}{tbody:id=8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD}{tr:id=name}{td}h6.addPolynomial{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}void{span}{span:id=iets|style=float: left; font-weight: bold;}addPolynomial{span}{span:id=iets|style=float: left;}\(polynomial){span}{td}{tr}{tr:id=des}{td}{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_des|text=|trigger=button}{sub-section}{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_des|trigger=none|class=sIndent}Adds another polynomial to this polynomial.{sub-section}{td}{tr}{tr:id=prs}{td}*Parameters*\\{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_prs|trigger=none}polynomial
{sub-section}{div}{td}{tr}{tr:id=ret}{td}*Returns*\\{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_ret|text=|trigger=button}{sub-section}{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_ret|trigger=none|class=sIndent}void{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_see|text=|trigger=button}{sub-section}{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_see|text=|trigger=button}{sub-section}{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_sam|text=|trigger=button}{sub-section}{sub-section:8899B303F31B0860-C96AA9B0-4D564A3B-B6148BE1-23520BC6C2B408E76380C5FD_sam|class=sIndent|trigger=none}{code:language=javascript}
// (x+1) + 2*(x+1)*x + 3*(x+1)*x^2 + 4*(x+1)*x^3
var eq = plugins.amortization.newPolynomial();
for (var i = 0; i < 4; i++)
{
	var base = plugins.amortization.newPolynomial();
	base.addTerm(1, 1);
	base.addTerm(1, 0);
	base.multiplyByTerm(1, i);
	base.multiplyByTerm(i + 1, 0);
	eq.addPolynomial(base);
}
application.output(eq.getValue(2));
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B}{tr:id=name}{td}h6.addTerm{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}void{span}{span:id=iets|style=float: left; font-weight: bold;}addTerm{span}{span:id=iets|style=float: left;}\(coefficient, exponent){span}{td}{tr}{tr:id=des}{td}{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_des|text=|trigger=button}{sub-section}{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_des|trigger=none|class=sIndent}Adds a term to this polynomial.{sub-section}{td}{tr}{tr:id=prs}{td}*Parameters*\\{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_prs|trigger=none}coefficient
exponent
{sub-section}{div}{td}{tr}{tr:id=ret}{td}*Returns*\\{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_ret|text=|trigger=button}{sub-section}{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_ret|trigger=none|class=sIndent}void{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_see|text=|trigger=button}{sub-section}{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_see|text=|trigger=button}{sub-section}{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_sam|text=|trigger=button}{sub-section}{sub-section:A02AA40325F71A64-46A58331-4AC34A37-88A29ACD-95A34E61F8C7C9C5BB9FF49B_sam|class=sIndent|trigger=none}{code:language=javascript}
// Model the quadratic equation -x^2 + 4x + 0.6 = 0
var eq = plugins.amortization.newPolynomial();
eq.addTerm(-1, 2);
eq.addTerm(4, 1);
eq.addTerm(0.6, 0);
// Find the roots of the equation.
r1 = eq.findRoot(100, 1E-5, 1000);
r2 = eq.findRoot(-100, 1E-5, 1000);
application.output("eq(" + r1 + ")=" + eq.getValue(r1));
application.output("eq(" + r2 + ")=" + eq.getValue(r2));
// Find the minimum/maximum point by zeroing the first derivative.
var deriv = eq.getDerivative();
rd = deriv.findRoot(0, 1E-5, 1000);
application.output("Min/max point: " + rd);
application.output("Min/max value: " + eq.getValue(rd));
if (deriv.getDerivativeValue(rd) < 0) application.output("Max point.");
else application.output("Min point.");
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B}{tr:id=name}{td}h6.findRoot{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}[Number]{span}{span:id=iets|style=float: left; font-weight: bold;}findRoot{span}{span:id=iets|style=float: left;}\(startValue, error, iterations){span}{td}{tr}{tr:id=des}{td}{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_des|text=|trigger=button}{sub-section}{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_des|trigger=none|class=sIndent}Finds a root of this polynomial using Newton's method, starting from an initial search value, and with a given precision.{sub-section}{td}{tr}{tr:id=prs}{td}*Parameters*\\{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_prs|trigger=none}startValue
error
iterations
{sub-section}{div}{td}{tr}{tr:id=ret}{td}*Returns*\\{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_ret|text=|trigger=button}{sub-section}{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_ret|trigger=none|class=sIndent}[Number]{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_see|text=|trigger=button}{sub-section}{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_see|text=|trigger=button}{sub-section}{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_sam|text=|trigger=button}{sub-section}{sub-section:7ADAEF3721A6C173-BDDB6E3B-410C4AB9-B912A1E7-84B03B80DBA7862DE7C8534B_sam|class=sIndent|trigger=none}{code:language=javascript}
// Model the quadratic equation -x^2 + 4x + 0.6 = 0
var eq = plugins.amortization.newPolynomial();
eq.addTerm(-1, 2);
eq.addTerm(4, 1);
eq.addTerm(0.6, 0);
// Find the roots of the equation.
r1 = eq.findRoot(100, 1E-5, 1000);
r2 = eq.findRoot(-100, 1E-5, 1000);
application.output("eq(" + r1 + ")=" + eq.getValue(r1));
application.output("eq(" + r2 + ")=" + eq.getValue(r2));
// Find the minimum/maximum point by zeroing the first derivative.
var deriv = eq.getDerivative();
rd = deriv.findRoot(0, 1E-5, 1000);
application.output("Min/max point: " + rd);
application.output("Min/max value: " + eq.getValue(rd));
if (deriv.getDerivativeValue(rd) < 0) application.output("Max point.");
else application.output("Min point.");
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276}{tr:id=name}{td}h6.getDerivative{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}[Polynomial]{span}{span:id=iets|style=float: left; font-weight: bold;}getDerivative{span}{span:id=iets|style=float: left;}\(){span}{td}{tr}{tr:id=des}{td}{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_des|text=|trigger=button}{sub-section}{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_des|trigger=none|class=sIndent}Returns a polynomial that holds the derivative of this polynomial.{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=prs}{td}*Parameters*\\{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_prs|trigger=none}{sub-section}{div}{td}{tr}{builder-show}{tr:id=ret}{td}*Returns*\\{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_ret|text=|trigger=button}{sub-section}{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_ret|trigger=none|class=sIndent}[Polynomial]{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_see|text=|trigger=button}{sub-section}{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_see|text=|trigger=button}{sub-section}{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_sam|text=|trigger=button}{sub-section}{sub-section:90C2DBF9A6B4A0AD-87CA2968-41114655-AE58A7E5-B5EF69AE34C6C2B30910B276_sam|class=sIndent|trigger=none}{code:language=javascript}
// Model the quadratic equation -x^2 + 4x + 0.6 = 0
var eq = plugins.amortization.newPolynomial();
eq.addTerm(-1, 2);
eq.addTerm(4, 1);
eq.addTerm(0.6, 0);
// Find the roots of the equation.
r1 = eq.findRoot(100, 1E-5, 1000);
r2 = eq.findRoot(-100, 1E-5, 1000);
application.output("eq(" + r1 + ")=" + eq.getValue(r1));
application.output("eq(" + r2 + ")=" + eq.getValue(r2));
// Find the minimum/maximum point by zeroing the first derivative.
var deriv = eq.getDerivative();
rd = deriv.findRoot(0, 1E-5, 1000);
application.output("Min/max point: " + rd);
application.output("Min/max value: " + eq.getValue(rd));
if (deriv.getDerivativeValue(rd) < 0) application.output("Max point.");
else application.output("Min point.");
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE}{tr:id=name}{td}h6.getDerivativeValue{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}[Number]{span}{span:id=iets|style=float: left; font-weight: bold;}getDerivativeValue{span}{span:id=iets|style=float: left;}\(x){span}{td}{tr}{tr:id=des}{td}{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_des|text=|trigger=button}{sub-section}{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_des|trigger=none|class=sIndent}Returns the value of the derivative of this polynomial in a certain point.{sub-section}{td}{tr}{tr:id=prs}{td}*Parameters*\\{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_prs|trigger=none}x
{sub-section}{div}{td}{tr}{tr:id=ret}{td}*Returns*\\{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_ret|text=|trigger=button}{sub-section}{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_ret|trigger=none|class=sIndent}[Number]{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_see|text=|trigger=button}{sub-section}{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_see|text=|trigger=button}{sub-section}{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_sam|text=|trigger=button}{sub-section}{sub-section:D01A04357B55C706-AB5D1BCD-4CC24384-8C819B23-F093A405200952ADF18052DE_sam|class=sIndent|trigger=none}{code:language=javascript}
// Model the quadratic equation -x^2 + 4x + 0.6 = 0
var eq = plugins.amortization.newPolynomial();
eq.addTerm(-1, 2);
eq.addTerm(4, 1);
eq.addTerm(0.6, 0);
// Find the roots of the equation.
r1 = eq.findRoot(100, 1E-5, 1000);
r2 = eq.findRoot(-100, 1E-5, 1000);
application.output("eq(" + r1 + ")=" + eq.getValue(r1));
application.output("eq(" + r2 + ")=" + eq.getValue(r2));
// Find the minimum/maximum point by zeroing the first derivative.
var deriv = eq.getDerivative();
rd = deriv.findRoot(0, 1E-5, 1000);
application.output("Min/max point: " + rd);
application.output("Min/max value: " + eq.getValue(rd));
if (deriv.getDerivativeValue(rd) < 0) application.output("Max point.");
else application.output("Min point.");
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516}{tr:id=name}{td}h6.getValue{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}[Number]{span}{span:id=iets|style=float: left; font-weight: bold;}getValue{span}{span:id=iets|style=float: left;}\(x){span}{td}{tr}{tr:id=des}{td}{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_des|text=|trigger=button}{sub-section}{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_des|trigger=none|class=sIndent}Returns the value of this polynomial in a certain point.{sub-section}{td}{tr}{tr:id=prs}{td}*Parameters*\\{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_prs|trigger=none}x
{sub-section}{div}{td}{tr}{tr:id=ret}{td}*Returns*\\{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_ret|text=|trigger=button}{sub-section}{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_ret|trigger=none|class=sIndent}[Number]{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_see|text=|trigger=button}{sub-section}{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_see|text=|trigger=button}{sub-section}{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_sam|text=|trigger=button}{sub-section}{sub-section:35F338EB294D7B65-62A7EB32-43144936-9D58BEA6-51DB875A4CAD21216F071516_sam|class=sIndent|trigger=none}{code:language=javascript}
// Model the quadratic equation -x^2 + 4x + 0.6 = 0
var eq = plugins.amortization.newPolynomial();
eq.addTerm(-1, 2);
eq.addTerm(4, 1);
eq.addTerm(0.6, 0);
// Find the roots of the equation.
r1 = eq.findRoot(100, 1E-5, 1000);
r2 = eq.findRoot(-100, 1E-5, 1000);
application.output("eq(" + r1 + ")=" + eq.getValue(r1));
application.output("eq(" + r2 + ")=" + eq.getValue(r2));
// Find the minimum/maximum point by zeroing the first derivative.
var deriv = eq.getDerivative();
rd = deriv.findRoot(0, 1E-5, 1000);
application.output("Min/max point: " + rd);
application.output("Min/max value: " + eq.getValue(rd));
if (deriv.getDerivativeValue(rd) < 0) application.output("Max point.");
else application.output("Min point.");
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85}{tr:id=name}{td}h6.multiplyByPolynomial{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}void{span}{span:id=iets|style=float: left; font-weight: bold;}multiplyByPolynomial{span}{span:id=iets|style=float: left;}\(polynomial){span}{td}{tr}{tr:id=des}{td}{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_des|text=|trigger=button}{sub-section}{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_des|trigger=none|class=sIndent}Multiplies this polynomial with another polynomial.{sub-section}{td}{tr}{tr:id=prs}{td}*Parameters*\\{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_prs|trigger=none}polynomial
{sub-section}{div}{td}{tr}{tr:id=ret}{td}*Returns*\\{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_ret|text=|trigger=button}{sub-section}{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_ret|trigger=none|class=sIndent}void{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_see|text=|trigger=button}{sub-section}{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_see|text=|trigger=button}{sub-section}{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_sam|text=|trigger=button}{sub-section}{sub-section:3D5B3773BC963906-4313A531-4B594B5D-88A6B549-32912FA3D7DF0B3C1F3A1E85_sam|class=sIndent|trigger=none}{code:language=javascript}
// Model the quadratic equation (x+1)*(x+2) = 0
var eq = plugins.amortization.newPolynomial();
eq.addTerm(1, 1);
eq.addTerm(1, 0);
var eq2 = plugins.amortization.newPolynomial();
eq2.addTerm(1, 1);
eq2.addTerm(2, 0);
eq.multiplyByPolynomial(eq2);
// Find the roots of the equation.
r1 = eq.findRoot(100, 1E-5, 1000);
r2 = eq.findRoot(-100, 1E-5, 1000);
application.output("eq(" + r1 + ")=" + eq.getValue(r1));
application.output("eq(" + r2 + ")=" + eq.getValue(r2));
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77}{tr:id=name}{td}h6.multiplyByTerm{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}void{span}{span:id=iets|style=float: left; font-weight: bold;}multiplyByTerm{span}{span:id=iets|style=float: left;}\(coefficient, exponent){span}{td}{tr}{tr:id=des}{td}{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_des|text=|trigger=button}{sub-section}{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_des|trigger=none|class=sIndent}Multiples this polynomial with a term.{sub-section}{td}{tr}{tr:id=prs}{td}*Parameters*\\{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_prs|trigger=none}coefficient
exponent
{sub-section}{div}{td}{tr}{tr:id=ret}{td}*Returns*\\{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_ret|text=|trigger=button}{sub-section}{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_ret|trigger=none|class=sIndent}void{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_see|text=|trigger=button}{sub-section}{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_see|text=|trigger=button}{sub-section}{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_sam|text=|trigger=button}{sub-section}{sub-section:047134E66A2A36E6-1248D894-4ED8494D-9C42ABCB-177392F69ACA7FF3325B7D77_sam|class=sIndent|trigger=none}{code:language=javascript}
// (x+1) + 2*(x+1)*x + 3*(x+1)*x^2 + 4*(x+1)*x^3
var eq = plugins.amortization.newPolynomial();
for (var i = 0; i < 4; i++)
{
	var base = plugins.amortization.newPolynomial();
	base.addTerm(1, 1);
	base.addTerm(1, 0);
	base.multiplyByTerm(1, i);
	base.multiplyByTerm(i + 1, 0);
	eq.addPolynomial(base);
}
application.output(eq.getValue(2));
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{tbody:id=0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C}{tr:id=name}{td}h6.setToZero{td}{tr}{tr:id=sig}{td}{span:style=float: left; margin-right: 5px;}void{span}{span:id=iets|style=float: left; font-weight: bold;}setToZero{span}{span:id=iets|style=float: left;}\(){span}{td}{tr}{tr:id=des}{td}{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_des|text=|trigger=button}{sub-section}{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_des|trigger=none|class=sIndent}Sets this polynomial to zero.{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=prs}{td}*Parameters*\\{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_prs|text=|trigger=button}{sub-section}{div:class=sIndent}{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_prs|trigger=none}{sub-section}{div}{td}{tr}{builder-show}{tr:id=ret}{td}*Returns*\\{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_ret|text=|trigger=button}{sub-section}{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_ret|trigger=none|class=sIndent}void{sub-section}{td}{tr}{builder-show:permission=edit}{tr:id=see}{td}*Also see*\\{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_see|text=|trigger=button}{sub-section}{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_see|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{builder-show:permission=edit}{tr:id=link}{td}*External links*\\{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_see|text=|trigger=button}{sub-section}{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_link|class=sIndent|trigger=none}{sub-section}{td}{tr}{builder-show}{tr:id=sam}{td}*Sample*\\{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_sam|text=|trigger=button}{sub-section}{sub-section:0E6C9600148AAB01-2868FCFF-498740C9-B72BBD74-EFCF95B56108877BE5951C2C_sam|class=sIndent|trigger=none}{code:language=javascript}
var eq = plugins.amortization.newPolynomial();
eq.addTerm(2, 3);
application.output(eq.getValue(1.1));
eq.setToZero();
application.output(eq.getValue(1.1));
{code}{sub-section}{td}{tr}{tr:class=lastDetailRow}{td}{td}{tr}{tbody}{table}