1 uždavinys
Sprendimas.
Sudarome lygtį $$y = (m-2)\cdot x+m-3$$ ir vietoj x statome 0, o vietoj y statome 1.
y =
(m-2)* x+m-3
(m-2)* x+m-3
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y = (m-2)* x+m-3$$y$$ = $$(m-2)\cdot x+m-3$$
Paaiškinimas: Keitimas $${\normalsize x}$$ = $$0$$.
y = (m-2)* 0+m-3$$y$$ = $$(m-2)\cdot 0+m-3$$
Paaiškinimas: Keitimas $${\normalsize y}$$ = $${\normalsize 1}$$.
1 = (m-2)* 0+m-3$$1$$ = $$(m-2)\cdot 0+m-3$$
1 = m-3$$1$$ = $$m-3$$
1+3 = m$$1+3$$ = $$m$$
$${\normalsize 1+3}$$ = $${\normalsize 4}$$
4 = m$$4$$ = $$m$$
$$y$$ = $$(m-2)\cdot x+m-3$$
$$1$$ = $$(m-2)\cdot 0+m-3$$
$$1$$ = $$m-3$$
$$4$$ = $$m$$
Atsakymas: D