CgsdHiou §The real number axis is the imaginary parabolic axis §upper bound on real numbers §Newton’s first law reformulated: for inertial motion, the imaginary projection of an object follows a parabolic path
CgsdHiou §The real number axis is the imaginary parabolic axis §upper bound on real numbers §Newton’s first law reformulated: for inertial motion, the imaginary projection of an object follows a parabolic path
真实世界的实数,虚数对应的抛物线 x²=2cy,c为光速
Real numbers in the real world correspond to parabolic motion with x²=2cy, where c is the speed of light.
(牛顿第一定律改造:惯性运动的物体,其虚数投影为抛物线运动。阿基米德三角形对应运动时,所排出的以太面积。)
(Newton’s first law reformulated: for inertial motion, the imaginary projection of an object follows a parabolic path. The area of ether expelled by the motion corresponds to the Archimedean triangle.)
准线 x_R=-\frac{c}{2},准线为实数轴
The axis of symmetry is x=-c/2, which corresponds to the real number axis.
普朗克点的可能性一 (x_0,y_0)=(\sqrt{2cL_p},L_p)
此时最大实数为R_{MAX}=\frac{c\times(-\frac{c}{2}+\sqrt{2\text{c}L_p})}{L_p}
For Plank’s point Possibility One (x_0,y_0)=(sqrt(2cL_p), L_p), the maximum real number is R_{MAX} = c*(-c/2+sqrt(2cL_p))/L_p.
普朗克点的可能性二 (x_0,y_0)=(L_p,\frac{{L_p}²}{2c})
此时最大实数为R_{MAX}=\frac{c\times(-\frac{c}{2}+L_p)}{\frac{{L_p}²}{2c}}=\frac{2c²\times(-\frac{c}{2}+L_p)}{{L_p}²}
For Plank’s point Possibility Two (x_0,y_0)=(L_p, L_p²/(2c)), the maximum real number is R_{MAX} = (2c²)(-c/2+L_p)/(L_p²).