9000090909 Časť: CUrčte \(m\in \mathbb{R}\) tak, aby priamka \(p\colon x = 1 + t,\ y = 2 - t,\ t\in \mathbb{R}\) bola rovnobežná s priamkou \(q\colon 2x + my - 3 = 0\).\(m = 2\)\(m = -2\)\(m = 11\)\(m = -\frac{1} {11}\)také \(m\) neexistuje
9000090910 Časť: CUrčte \(m\in \mathbb{R}\) tak, aby priamka \(p\colon x = 1 + mt,\ y = 2 - 3t,\ t\in \mathbb{R}\) bola rovnobežná s priamkou \(q\colon x + 4y - 3 = 0\).\(m = 12\)\(m = -\frac{1} {12}\)\(m = 4\)\(m = \frac{5} {2}\)\(m = -1\)
9000090903 Časť: CUrčte \(m\in \mathbb{R}\) tak, aby bod \(C = [m;0]\) ležal na priamke \(p\). \[ p\colon 3x - 2y + 11 = 0\]\(m = -\frac{11} {3} \)\(m = -1\)\(m = 11\)\(m = -\frac{1} {11}\)\(m = 2\)