Pages that link to "Template:BookReference"
The following pages link to Template:BookReference:
View (previous 50 | next 50) (20 | 50 | 100 | 250 | 500)- Polar coordinates (transclusion) (← links)
- Logarithm (multivalued) (transclusion) (← links)
- Relationship between logarithm (multivalued) and logarithm (transclusion) (← links)
- Logarithm (multivalued) of product is a sum of logarithms (multivalued) (transclusion) (← links)
- Logarithm of product is a sum of logarithms (transclusion) (← links)
- Logarithm (multivalued) of a quotient is a difference of logarithms (multivalued) (transclusion) (← links)
- Logarithm of a quotient is a difference of logarithms (transclusion) (← links)
- Relationship between logarithm (multivalued) and positive integer exponents (transclusion) (← links)
- Relationship between logarithm and positive integer exponents (transclusion) (← links)
- Logarithm of 1 (transclusion) (← links)
- Logarithm diverges to negative infinity at 0 from right (transclusion) (← links)
- Logarithm at minus 1 (transclusion) (← links)
- Logarithm at i (transclusion) (← links)
- Logarithm at -i (transclusion) (← links)
- E is limit of (1+1/n)^n (transclusion) (← links)
- Taylor series of log(1+z) (transclusion) (← links)
- Series for log(z) for Re(z) greater than 1/2 (transclusion) (← links)
- Series for log(z) for absolute value of (z-1) less than 1 (transclusion) (← links)
- Series for log(z) for Re(z) greater than 0 (transclusion) (← links)
- Laurent series for log((z+1)/(z-1)) for absolute value of z greater than 1 (transclusion) (← links)
- Series for log(z+a) for positive a and Re(z) greater than -a (transclusion) (← links)
- Gamma(z) as integral of a power of log(1/t) for Re(z) greater than 0 (transclusion) (← links)
- Gamma function written as a limit of a factorial, exponential, and a rising factorial (transclusion) (← links)
- Gamma function written as infinite product (transclusion) (← links)
- Reciprocal gamma written as an infinite product (transclusion) (← links)
- Erf of conjugate is conjugate of erf (transclusion) (← links)
- Two-sided inequality for e^(x^2) integral from x to infinity e^(-t^2) dt for non-negative real x (transclusion) (← links)
- Continued fraction for 2e^(z^2) integral from z to infinity e^(-t^2) dt for positive Re(z) (transclusion) (← links)
- Continued fraction for 1/sqrt(pi) integral from -infinity to infinity of e^(-t^2)/(z-t) dt (transclusion) (← links)
- Limit of erf when z approaches infinity and the modulus of arg(z) is less than pi/4 (transclusion) (← links)
- Anger of integer order is Bessel J (transclusion) (← links)
- Versine (transclusion) (← links)
- Coversine (transclusion) (← links)
- Haversine (transclusion) (← links)
- Exsecant (transclusion) (← links)
- Logarithm (multivalued) of the exponential (transclusion) (← links)
- Logarithm of exponential (transclusion) (← links)
- Exponential of logarithm (transclusion) (← links)
- E^(-x/(1-x)) is less than 1-x is less than e^(-x) for nonzero real x less than 1 (transclusion) (← links)
- E^x is greater than 1+x for nonzero real x (transclusion) (← links)
- E^x is less than 1/(1-x) for nonzero real x less than 1 (transclusion) (← links)
- X/(1+x) less than 1-e^(-x) less than x for nonzero real x greater than -1 (transclusion) (← links)
- X less than e^x-1 less than x/(1-x) for nonzero real x less than 1 (transclusion) (← links)
- 1+x greater than exp(x/(1+x)) for nonzero real x greater than -1 (transclusion) (← links)
- E^x greater than 1+x^n/n! for n greater than 0 and nonzero real x greater than 0 (transclusion) (← links)
- E^x greater than (1+x/y)^y greater than exp(xy/(x+y) for x greater than 0 and y greater than 0) (transclusion) (← links)
- E^(-x) less than 1-(x/2) for 0 less than x less than or equal to 1.5936 (transclusion) (← links)
- Abs(z)/4 less than abs(e^z-1) less than (7abs(z))/4 for 0 less than abs(z) less than 1 (transclusion) (← links)
- Abs(e^z-1) less than or equal to e^(abs(z))-1 less than or equal to abs(z)e^(abs(z)) (transclusion) (← links)
- Gauss' formula for gamma function (transclusion) (← links)
