Расчет: 0vWLGn - 1
cos(α) =
| ( x1* x2+ y1* y2) |
/ ( saknis( x1^2+ y1^2)* saknis( x2^2+ y2^2)) |
|
|
cos(α) =
$$cos(\alpha)$$ = $$\frac{x1\cdot x2+y1\cdot y2}{\sqrt {x1^{2}+y1^{2}}\cdot \sqrt {x2^{2}+y2^{2}}}$$
| ( x1* x2+ y1* y2) |
| / ( saknis( x1^2+ y1^2)* saknis( x2^2+ y2^2)) |
cos(α) =
+
$$cos(\alpha)$$ = $$\frac{x1\cdot x2}{\sqrt {x1^{2}+y1^{2}}\cdot \sqrt {x2^{2}+y2^{2}}}+\frac{y1\cdot y2}{\sqrt {x1^{2}+y1^{2}}\cdot \sqrt {x2^{2}+y2^{2}}}$$
| x1* x2 |
| / saknis( x1^2+ y1^2)/ saknis( x2^2+ y2^2) |
| y1* y2 |
| / saknis( x1^2+ y1^2)/ saknis( x2^2+ y2^2) |
α = arccos((
+
))$$\alpha$$ = $$arccos((\frac{x1\cdot x2}{\sqrt {x1^{2}+y1^{2}}\cdot \sqrt {x2^{2}+y2^{2}}}+\frac{y1\cdot y2}{\sqrt {x1^{2}+y1^{2}}\cdot \sqrt {x2^{2}+y2^{2}}}))$$
| x1* x2 |
| / saknis( x1^2+ y1^2)/ saknis( x2^2+ y2^2) |
| y1* y2 |
| / saknis( x1^2+ y1^2)/ saknis( x2^2+ y2^2) |
α = arccos(
+
)$$\alpha$$ = $$arccos(\frac{x1\cdot x2}{\sqrt {x1^{2}+y1^{2}}\cdot \sqrt {x2^{2}+y2^{2}}}+\frac{y1\cdot y2}{\sqrt {x1^{2}+y1^{2}}\cdot \sqrt {x2^{2}+y2^{2}}})$$
| x1* x2 |
| / saknis( x1^2+ y1^2)/ saknis( x2^2+ y2^2) |
| y1* y2 |
| / saknis( x1^2+ y1^2)/ saknis( x2^2+ y2^2) |