Help meeee

[kyliesuee]

if F is between E & G. EG=8x, EF=6x+8 and FG=27
X=? EG=?

K is the mid point oh JL. JK=4x and KL=2x+6.
JK=?
KL=?
JL=?


BD bisects <abc, m<abc=(10x-5) and m<dbc=(7x+1)
<abd=?


A line intersecting a plane but not lying in the plane creates a?

 

[Mrspi]

if F is between E & G. EG=8x, EF=6x+8 and FG=27
X=? EG=?

K is the mid point oh JL. JK=4x and KL=2x+6.
JK=?
KL=?
JL=?


BD bisects <abc, m<abc=(10x-5) and m<dbc=(7x+1)
<abd=?


A line intersecting a plane but not lying in the plane creates a?

First problem hint:

Draw a diagram showing that F is between E and G. The definition of "between" tells us that F, E and G must lie on the same line:


E........F..........G
and the distances EF and FG must add up to the distance EG:

EF + FG = EG

You're given expressions you can substitute for EF, FG and EG:
EF = 6x + 8
FG = 27
EG = 8x

EF + FG = EG
(6x + 8) + 27 = 8x

Solve for x, and use the value you get to find the distances.

Hint for #2....K is the midpoint, so K must be BETWEEN J and L, and the distances JK and KL must be equal (in addition to the fact that JK + KL = JL). Substitute the expressions you are given for some of these lengths, solve for x, and use the value of x to find the desired lengths.

Hint for #3....the bisector of an angle divides the angle into two smaller parts which are EQUAL. And each of those smaller angles must be equal to HALF of the original big angle. You can set up an equation to solve for x.....

Hint for #4: Your book is your best source of information about the relationship between a line and a plane.

We don't do work for you, or give answers.

See what you can do with the hints I've given.