Asked by Help
Graphing linear functions quiz
Find a slope.
2
-1/2
-2
1/2
Does anyone know all the answers
Find a slope.
2
-1/2
-2
1/2
Does anyone know all the answers
Answers
Answered by
annnnoooonnnnymoose
"Does anyone know all the answers" bruh this is supposed to be homework help not quiz answer help
Answered by
Help
That’s what I meant
Answered by
Help da homie
C
A
B
B
C
C
C
B
Hope this helps.
A
B
B
C
C
C
B
Hope this helps.
Answered by
Depressed_Potato
Yes it helps
Help da homie is 100% correct : )
Help da homie is 100% correct : )
Answered by
cherry cola 🍒
u are 100% correct tysm 😩
Answered by
<3
Yes u r right thx babe
Answered by
dewey
theyre still right !!
Answered by
that one kid with the letter t
YOOOOOOOOOOOOOOOO help da homie is right trust me he is dead right on the dot i got 8/8
read my name self explanitory
Answered by
i need help
im a connexus student and i got 2/7
Answered by
Bella
100 hundred 8/8 tysm help da homie - unit 5 lesson 6 graphing linear functions.
Answered by
Waffeler
still correct tysm
Answered by
He is Right
help da homie is still right
Answered by
someone who iza helper
Yup @help da homie is correct
Answered by
Mr. Brian
Is 1.6 0.8 0.4 0.2 arithmetic or geometric or neither? Explain your answer.
Answered by
Mr. Brian
thanks
Answered by
Bot
Great to hear that! Always happy to help.
Answered by
Bot
The given sequence 1.6, 0.8, 0.4, 0.2 is neither arithmetic nor geometric.
For an arithmetic sequence, the difference between consecutive terms should be a constant value. Here, the difference between 1.6 and 0.8 is -0.8. But the difference between 0.8 and 0.4 is -0.4, which is not equal to the previous difference of -0.8. Hence, the sequence is not arithmetic.
For a geometric sequence, the ratio of consecutive terms should be a constant value. Here, the ratio between 1.6 and 0.8 is 2. But the ratio between 0.8 and 0.4 is also 2, which is equal to the previous ratio. But, the ratio between 0.4 and 0.2 is again 2, which is equal to the previous ratio. Therefore, the sequence is not geometric.
Thus, the given sequence is neither arithmetic nor geometric.
For an arithmetic sequence, the difference between consecutive terms should be a constant value. Here, the difference between 1.6 and 0.8 is -0.8. But the difference between 0.8 and 0.4 is -0.4, which is not equal to the previous difference of -0.8. Hence, the sequence is not arithmetic.
For a geometric sequence, the ratio of consecutive terms should be a constant value. Here, the ratio between 1.6 and 0.8 is 2. But the ratio between 0.8 and 0.4 is also 2, which is equal to the previous ratio. But, the ratio between 0.4 and 0.2 is again 2, which is equal to the previous ratio. Therefore, the sequence is not geometric.
Thus, the given sequence is neither arithmetic nor geometric.
Answered by
Bot
You're welcome!
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