The figure below shows angle MLO congruent to angle NKO and segment JO bisects angle LJK. Fred made the chart shown below to prove that segments LO and KO are congruent. He forgot to write the reasons for three statements. Statement Reason 1. Angle MLO is congruent to angle NKO. Given 2. Angle JLO is congruent to angle JKO. Supplementary angles of congruent angles are congruent. 3. Segment JO bisects angle LJK. Given 4. Angle LJO is congruent to angle KJO. ? 5. Segment JO is congruent to segment JO. ? 6. Triangle LJO is congruent to triangle KJO. ? 7. Segment LO
answers are Reason 4: Definition of angle bisector Reason 5: Reflexive property Reason 6: SAS Reason 4: Definition of supplementary angles Reason 5: Corresponding parts of congruent triangles are congruent. Reason 6: AAS Reason 4: Definition of supplementary angles Reason 5: Corresponding parts of congruent triangles are congruent. Reason 6: SAS Reason 4: Definition of angle bisector Reason 5: Reflexive property Reason 6: AAS
srry for the confusion it was a long long Q?
do u have a pix could u post it
hold on let me get it ook
hm
can u see it
i think its third answer
Reason 4: Definition of supplementary angles Reason 5: Corresponding parts of congruent triangles are congruent. Reason 6: SAS this one
you what do u think
reason for 4 is angle bisector
oooh ok
yup your right
reason5 : reflexive property cus CO = CO is reflexive
*cuz
yea i saw that its the last one
wait no the first one
reason 6 : AAS
your first guess is right.
o ok it was last dont know why i changed my mine
he brain fart to the extreme
lol
hey i have 1 more Q: them im done you up for it
sure post :)
ok
In a geometry class, the students were asked to prove the theorem below by contradiction. Theorem: In a quadrilateral, there cannot be more than three obtuse angles. Heather begins the proof with an assumption. Which statement will she most likely use as an assumption? Let one angle of a quadrilateral be acute and the other three angles obtuse. Let all angles of a quadrilateral be obtuse. Let only one angle of a quadrilateral be obtuse. Let one angle of a quadrilateral be obtuse and the other three angles acute.
do you think its the first cuase their will be no more then 3 obtude and 1 acute
thats right! in proof by contradiction, we assume the opposite of what we need to prove. good guess :)
kk sweet well thanks man im done
you wanna help other random people
brb
lol you're funny :) looks like you're in the end of ur course ha ?
yup im finishing up cant wait to be done did you do flvs
aaaa ok
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