ChannelType USINT !< 0x00 TYPE [...] 0x01 reserved ulSizeOfChannel UDINT !< 0x04 Size

such that the second derivative at x=0 [...] The function value at x=0 f [...] value at x=l f0_x

and third derivative at x=0 [...] The function value at x=0 f [...] value at x=l f0_x

derivative at x=0 and x [...] The function value at x=0 f [...] value at x=l f0_x

derivative are zero at x=0 [...] for param transform 0 f0_0_x [...] derivative at x=0

The function value at x=0 f [...] value at x=l f0_x [...] derivative at x=0 f1_x

+1 coefficients a[0] .. a[n], p(x [...] of the polynomial p(x) = Sum(0 <= [...] .IS_SPHERE_MAX_ROOTS-1)/2. dX0 LREAL Roots

for param transform 0 f0_0_x [...] derivative at x=0 for param transform 0 f0_1_x

x = 0 \\1 &\mbox{if } x > 0 \end [...] to input value \(x\) :

!= 0 => x = floor(x [...] 0 => 0 <= fmod(x [...] . m = 0 => fmod(x