Translation for "perspektiivimuunnoksen" to english
Translation examples
Perspektiivimuunnoksen jälkeen uusi arvo z {\displaystyle z} tai z ′ {\displaystyle z'} saadaan lausekkeesta z ′ = f a r + n e a r f a r − n e a r + 1 z ( − 2 ⋅ f a r ⋅ n e a r f a r − n e a r ) {\displaystyle z'={\frac {{\mathit {far}}+{\mathit {near}}}{{\mathit {far}}-{\mathit {near}}}}+{\frac {1}{z}}\left({\frac {-2\cdot {\mathit {far}}\cdot {\mathit {near}}}{{\mathit {far}}-{\mathit {near}}}}\right)} Missä z {\displaystyle z} on vanha z {\displaystyle z} kamera-avaruudessa, ja sitä merkitään joskus w {\displaystyle w} tai w ′ {\displaystyle w'} .
After a perspective transformation, the new value of z {\displaystyle z} , or z ′ {\displaystyle z'} , is defined by: z ′ = f a r + n e a r f a r − n e a r + 1 z ( − 2 ⋅ f a r ⋅ n e a r f a r − n e a r ) {\displaystyle z'={\frac {{\mathit {far}}+{\mathit {near}}}{{\mathit {far}}-{\mathit {near}}}}+{\frac {1}{z}}\left({\frac {-2\cdot {\mathit {far}}\cdot {\mathit {near}}}{{\mathit {far}}-{\mathit {near}}}}\right)} After an orthographic projection, the new value of z {\displaystyle z} , or z ′ {\displaystyle z'} , is defined by: z ′ = 2 ⋅ z − n e a r f a r − n e a r − 1 {\displaystyle z'=2\cdot {\frac {{z}-{\mathit {near}}}{{\mathit {far}}-{\mathit {near}}}}-1} where z {\displaystyle z} is the old value of z {\displaystyle z} in camera space, and is sometimes called w {\displaystyle w} or w ′ {\displaystyle w'} .
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