Java Code Examples for org.apache.commons.math.util.FastMath#cosh()
The following examples show how to use
org.apache.commons.math.util.FastMath#cosh() .
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Example 1
| Source File: ArrayRealVector.java From astor with GNU General Public License v2.0 | 5 votes |
|
/** {@inheritDoc} */
@Override
public RealVector mapCoshToSelf() {
for (int i = 0; i < data.length; i++) {
data[i] = FastMath.cosh(data[i]);
}
return this;
}
Example 2
| Source File: Math_37_Complex_t.java From coming with MIT License | 4 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/Tangent.html" TARGET="_top">
* tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sin(2a)/(cos(2a)+cosh(2b)) + [sinh(2b)/(cos(2a)+cosh(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite (or critical) values in real or imaginary parts of the input may
* result in infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tan(a ± INFINITY i) = 0 ± i
* tan(±INFINITY + bi) = NaN + NaN i
* tan(±INFINITY ± INFINITY i) = NaN + NaN i
* tan(±π/2 + 0 i) = ±INFINITY + NaN i
* </code>
* </pre>
*
* @return the tangent of {@code this}.
* @since 1.2
*/
public Complex tan() {
if (isNaN || Double.isInfinite(real)) {
return NaN;
}
if (imaginary > 20.0) {
return createComplex(0.0, 1.0);
}
if (imaginary < -20.0) {
return createComplex(0.0, -1.0);
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cos(real2) + FastMath.cosh(imaginary2);
return createComplex(FastMath.sin(real2) / d,
FastMath.sinh(imaginary2) / d);
}
Example 3
| Source File: Math_37_Complex_t.java From coming with MIT License | 4 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/HyperbolicTangent.html" TARGET="_top">
* hyperbolic tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sinh(2a)/(cosh(2a)+cos(2b)) + [sin(2b)/(cosh(2a)+cos(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite values in real or imaginary parts of the input may result in
* infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tanh(a ± INFINITY i) = NaN + NaN i
* tanh(±INFINITY + bi) = ±1 + 0 i
* tanh(±INFINITY ± INFINITY i) = NaN + NaN i
* tanh(0 + (π/2)i) = NaN + INFINITY i
* </code>
* </pre>
*
* @return the hyperbolic tangent of {@code this}.
* @since 1.2
*/
public Complex tanh() {
if (isNaN || Double.isInfinite(imaginary)) {
return NaN;
}
if (real > 20.0) {
return createComplex(1.0, 0.0);
}
if (real < -20.0) {
return createComplex(-1.0, 0.0);
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cosh(real2) + FastMath.cos(imaginary2);
return createComplex(FastMath.sinh(real2) / d,
FastMath.sin(imaginary2) / d);
}
Example 4
| Source File: Complex_t.java From coming with MIT License | 4 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/Tangent.html" TARGET="_top">
* tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sin(2a)/(cos(2a)+cosh(2b)) + [sinh(2b)/(cos(2a)+cosh(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite (or critical) values in real or imaginary parts of the input may
* result in infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tan(a ± INFINITY i) = 0 ± i
* tan(±INFINITY + bi) = NaN + NaN i
* tan(±INFINITY ± INFINITY i) = NaN + NaN i
* tan(±π/2 + 0 i) = ±INFINITY + NaN i
* </code>
* </pre>
*
* @return the tangent of {@code this}.
* @since 1.2
*/
public Complex tan() {
if (isNaN || Double.isInfinite(real)) {
return NaN;
}
if (imaginary > 20.0) {
return createComplex(0.0, 1.0);
}
if (imaginary < -20.0) {
return createComplex(0.0, -1.0);
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cos(real2) + FastMath.cosh(imaginary2);
return createComplex(FastMath.sin(real2) / d,
FastMath.sinh(imaginary2) / d);
}
Example 5
| Source File: Complex_t.java From coming with MIT License | 4 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/HyperbolicTangent.html" TARGET="_top">
* hyperbolic tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sinh(2a)/(cosh(2a)+cos(2b)) + [sin(2b)/(cosh(2a)+cos(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite values in real or imaginary parts of the input may result in
* infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tanh(a ± INFINITY i) = NaN + NaN i
* tanh(±INFINITY + bi) = ±1 + 0 i
* tanh(±INFINITY ± INFINITY i) = NaN + NaN i
* tanh(0 + (π/2)i) = NaN + INFINITY i
* </code>
* </pre>
*
* @return the hyperbolic tangent of {@code this}.
* @since 1.2
*/
public Complex tanh() {
if (isNaN || Double.isInfinite(imaginary)) {
return NaN;
}
if (real > 20.0) {
return createComplex(1.0, 0.0);
}
if (real < -20.0) {
return createComplex(-1.0, 0.0);
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cosh(real2) + FastMath.cos(imaginary2);
return createComplex(FastMath.sinh(real2) / d,
FastMath.sin(imaginary2) / d);
}
Example 6
| Source File: Cosh.java From astor with GNU General Public License v2.0 | 4 votes |
|
/** {@inheritDoc} */
public double value(double x) {
return FastMath.cosh(x);
}
Example 7
| Source File: ComposableFunction.java From astor with GNU General Public License v2.0 | 4 votes |
|
/** {@inheritDoc} */
@Override
public double value(double d) {
return FastMath.cosh(d);
}
Example 8
| Source File: Cosh.java From astor with GNU General Public License v2.0 | 4 votes |
|
/** {@inheritDoc} */
public double value(double x) {
return FastMath.cosh(x);
}
Example 9
| Source File: Cosh.java From astor with GNU General Public License v2.0 | 4 votes |
|
/** {@inheritDoc} */
public double value(double x) {
return FastMath.cosh(x);
}
Example 10
| Source File: Math_37_Complex_s.java From coming with MIT License | 3 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/Tangent.html" TARGET="_top">
* tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sin(2a)/(cos(2a)+cosh(2b)) + [sinh(2b)/(cos(2a)+cosh(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite (or critical) values in real or imaginary parts of the input may
* result in infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tan(a ± INFINITY i) = 0 ± i
* tan(±INFINITY + bi) = NaN + NaN i
* tan(±INFINITY ± INFINITY i) = NaN + NaN i
* tan(±π/2 + 0 i) = ±INFINITY + NaN i
* </code>
* </pre>
*
* @return the tangent of {@code this}.
* @since 1.2
*/
public Complex tan() {
if (isNaN) {
return NaN;
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cos(real2) + FastMath.cosh(imaginary2);
return createComplex(FastMath.sin(real2) / d,
FastMath.sinh(imaginary2) / d);
}
Example 11
| Source File: Math_37_Complex_s.java From coming with MIT License | 3 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/HyperbolicTangent.html" TARGET="_top">
* hyperbolic tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sinh(2a)/(cosh(2a)+cos(2b)) + [sin(2b)/(cosh(2a)+cos(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite values in real or imaginary parts of the input may result in
* infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tanh(a ± INFINITY i) = NaN + NaN i
* tanh(±INFINITY + bi) = ±1 + 0 i
* tanh(±INFINITY ± INFINITY i) = NaN + NaN i
* tanh(0 + (π/2)i) = NaN + INFINITY i
* </code>
* </pre>
*
* @return the hyperbolic tangent of {@code this}.
* @since 1.2
*/
public Complex tanh() {
if (isNaN) {
return NaN;
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cosh(real2) + FastMath.cos(imaginary2);
return createComplex(FastMath.sinh(real2) / d,
FastMath.sin(imaginary2) / d);
}
Example 12
| Source File: Complex_s.java From coming with MIT License | 3 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/Tangent.html" TARGET="_top">
* tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sin(2a)/(cos(2a)+cosh(2b)) + [sinh(2b)/(cos(2a)+cosh(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite (or critical) values in real or imaginary parts of the input may
* result in infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tan(a ± INFINITY i) = 0 ± i
* tan(±INFINITY + bi) = NaN + NaN i
* tan(±INFINITY ± INFINITY i) = NaN + NaN i
* tan(±π/2 + 0 i) = ±INFINITY + NaN i
* </code>
* </pre>
*
* @return the tangent of {@code this}.
* @since 1.2
*/
public Complex tan() {
if (isNaN) {
return NaN;
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cos(real2) + FastMath.cosh(imaginary2);
return createComplex(FastMath.sin(real2) / d,
FastMath.sinh(imaginary2) / d);
}
Example 13
| Source File: Complex_s.java From coming with MIT License | 3 votes |
|
/**
* Compute the
* <a href="http://mathworld.wolfram.com/HyperbolicTangent.html" TARGET="_top">
* hyperbolic tangent</a> of this complex number.
* Implements the formula:
* <pre>
* <code>
* tan(a + bi) = sinh(2a)/(cosh(2a)+cos(2b)) + [sin(2b)/(cosh(2a)+cos(2b))]i
* </code>
* </pre>
* where the (real) functions on the right-hand side are
* {@link FastMath#sin}, {@link FastMath#cos}, {@link FastMath#cosh} and
* {@link FastMath#sinh}.
* <br/>
* Returns {@link Complex#NaN} if either real or imaginary part of the
* input argument is {@code NaN}.
* <br/>
* Infinite values in real or imaginary parts of the input may result in
* infinite or NaN values returned in parts of the result.
* <pre>
* Examples:
* <code>
* tanh(a ± INFINITY i) = NaN + NaN i
* tanh(±INFINITY + bi) = ±1 + 0 i
* tanh(±INFINITY ± INFINITY i) = NaN + NaN i
* tanh(0 + (π/2)i) = NaN + INFINITY i
* </code>
* </pre>
*
* @return the hyperbolic tangent of {@code this}.
* @since 1.2
*/
public Complex tanh() {
if (isNaN) {
return NaN;
}
double real2 = 2.0 * real;
double imaginary2 = 2.0 * imaginary;
double d = FastMath.cosh(real2) + FastMath.cos(imaginary2);
return createComplex(FastMath.sinh(real2) / d,
FastMath.sin(imaginary2) / d);
}
