Question

A line and two trianples are shown on the coordinate plane. The siope between \( R \) and \( T \) is the same as the slope between \( J \) and \( L \). Choose the correct justification for this fact. slope between \( R \) and \( T \) and the slope between \( I \) and \( L \) are both equal to \( -\frac{4}{5} \), \( \triangle R S T \) and \( \triangle K L \) are congruent, so the ratio \( \frac{s T}{\pi S} \) is equal to the ratio \( \frac{J K}{K L} \).The slope between \( R \) and \( T \) and the slope between \( J \) and \( t \) are both equal to \( =\frac{4}{J} \) : \( \triangle R S T \) and \( \triangle M K L \) are similar, so the ratio \( \frac{n S}{S T} \) is equal to the ratio \( \frac{M K}{K L} \). The mope between \( R \) and \( T \) and the slope between \( J \) and \( L \) are both equal to \( -\frac{3}{4} \). \( \triangle R S T \) and \( \triangle K L \) are similar, so the ratio \( \frac{R E}{R T} \) is equal to the ratio \( \frac{J K}{K L} \), The slope between \( R \) and \( T \) and the stope between \( J \) and \( L \) are both equal to \( -\frac{3}{4} \). Sintion

          A line and two trianples are shown on the coordinate plane.

The siope between \( R \) and \( T \) is the same as the slope between \( J \) and \( L \). Choose the correct justification for this fact. slope between \( R \) and \( T \) and the slope between \( I \) and \( L \) are both equal to \( -\frac{4}{5} \),
\( \triangle R S T \) and \( \triangle K L \) are congruent, so the ratio \( \frac{s T}{\pi S} \) is equal to the ratio \( \frac{J K}{K L} \).The slope between \( R \) and \( T \) and the slope between \( J \) and \( t \) are both equal to \( =\frac{4}{J} \) :
\( \triangle R S T \) and \( \triangle M K L \) are similar, so the ratio \( \frac{n S}{S T} \) is equal to the ratio \( \frac{M K}{K L} \). The mope between \( R \) and \( T \) and the slope between \( J \) and \( L \) are both equal to \( -\frac{3}{4} \).
\( \triangle R S T \) and \( \triangle K L \) are similar, so the ratio \( \frac{R E}{R T} \) is equal to the ratio \( \frac{J K}{K L} \), The slope between \( R \) and \( T \) and the stope between \( J \) and \( L \) are both equal to \( -\frac{3}{4} \).
Sintion

A line and two trianples are shown on the coordinate plane.

The siope between R and T is the same as the slope between J and L. Choose the correct justification for this fact. slope between R and T and the slope between I and L are both equal to -(4)/(5),
R S T and K L are congruent, so the ratio (s T)/(π S) is equal to the ratio (J K)/(K L).The slope between R and T and the slope between J and t are both equal to =(4)/(J) :
R S T and M K L are similar, so the ratio (n S)/(S T) is equal to the ratio (M K)/(K L). The mope between R and T and the slope between J and L are both equal to -(3)/(4).
R S T and K L are similar, so the ratio (R E)/(R T) is equal to the ratio (J K)/(K L), The slope between R and T and the stope between J and L are both equal to -(3)/(4).
Sintion

Added by Howard S.

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