2977a1…: “With a spring parallelogram”

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Define $T$ as follows.

\[ T(v) = \begin{cases} 2v-1 & \text { if } -4 < v \leq -1 \\ -v+7 & \text { if } 1 \leq v < 7 \end{cases} \]

Graph of $y = T(v)$.

Define $F$ as follows.

\[ F(x) = -x + 1 \, \text { with domain } \, [-3, 5] \]

To investigate the function $F \circ T$ we need the range of $F$ and the domain of $T$.

The range of $T$ is $\left ( \answer {-7}, \answer {-3} \right ] \cup \left ( \answer {0}, \answer {6} \right ]$.

The domain of $F$ is $\left [ \answer {-3}, \answer {5} \right ]$.

Their intersection is $\left \{ \answer {-3} \right \} \cup \left ( 0, 5 \right ]$.

2025-05-17 16:15:24