Answer:
like terms are numbers or letters that are a like.
y² is the only letter with a square in this problem. Whilst xy and 2xy are the same.
y²+ xy + 2xy
y² there is no letter with square again.
xy+2xy is the same as one orange + two orange.
1 is never written against a letter.
y²+ xy + 2xy
y²+3xy
The arithmetic sequences are options A, C, and E.
<h3>What is an arithmetic sequence?</h3>
An arithmetic sequence is a succession of numbers that differ by a constant quantity called the difference of the progression. According to the above, it can be inferred that the arithmetic sequences are:
- A. 9, 6, 3, 0 ... in this sequence the difference is -3.
- C. 50, 52, 54, 56 ..., in this progression the difference is 2.
- E. 7, 21, 35, 59 ..., in this progression the difference is 14.
According to the above, options A, C and E are progressions because they have constant differences in the sequences, which makes it possible to identify the numbers that follow in the sequence.
Learn more about arithmetic in: brainly.com/question/2171130
Fred walked 10 meters down and 24 to the right. You can think of these two segments as the legs of a right triangle.
The hypotenuse of this triangle is the path Fred would have walked through the pond. So, this distance is
So, instead of walking 10+24=34 meters, he could have walked 26 meters, saving 34-26=8 meters.
Answer:
It would be length x width so I'mma say it's 40cm
Step-by-step explanation:
length 7cm+2cm+1cm=10cm
width 2cm+2cm=4cm
length × width
10×4=40
40cm
Answer: B. They are alternate interior angles, so angle 3 also measures 130°.
Step-by-step explanation:
Here, according to the given figure, lines a and c are parallel lines.
And pipe cleaner is a transversal which is passing through to these parallel lines.
Therefore, by the property of parallel lines, the corresponding and alternative exterior or interior angles made by the common transversal ( pipe cleaner) on the lines a and c must be equal.
And, Here and are alternative interior angles by lines a and c with the same transversal, So, they must be equal.
Thus,