Are the triangles similar?

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Answer 1

Answer: No the side’s are different

Related Questions

I need help with this problem
Which classification best represents a triangle with side lengths 10 in., 12 in., and 15 in.?
What is the answer? -5+(-4)=?
What is the slope for this graph?
Translate the phrase into an algebraic expression The sum of c and 4

Write an explicit rule to represent the sequence :
4, 10, 16, 22,...

Answers

It's an arithmetic sequence:

$a_1=4;\ a_2=10;\ a_3=16;\ a_4=22;\ ...$

The explicit rule:

$a_n=a_1+(n-1)d$

$d=a_(n+1)-a_n\to d=a_2-a_1=a_3-a_2=a_4-a_3=...$

$d=10-4=16-10=22-16=6$

Substitute:

$f(n)=4+(n-1)(6)=4+6n-6=6n-2$

Answer: f(n) = 6n - 2

The number that appears most often in a given set of data is called the ______.

Answers

Answer: Mode

For instance, the mode of the set {1,2,3,5,4,4,6,4,8,4,4,7,4} is 4 because it shows up the most compared to the other values. Making a frequency table can be helpful to determine the mode.

Final answer:

In statistics, the most recurring number in a data set is identified as the mode. It is calculated by identifying the frequency of each number in the data set. A data set may have one mode, no mode, or more than one mode.

Explanation:

The number that appears most often in a given set of data is called the mode. The mode is an important concept of statistics and helps in identifying the most frequent value in a data set. There can be more than one mode for a data set if they have the same frequency, which is the number of times a value appears in the data set. For example, in a data set of [2, 3, 3, 5, 5], both 3 and 5 are modes because they appeared twice each, which is more frequently than any other number in the data.

In some cases, the data set might have no mode when no number repeats or two modes, which will then be referred to as bimodal.

Learn more about Mode here:

brainly.com/question/35514036

#SPJ11

I have no idea how to find the values of x and y in that diagram. Can someone help?

Answers

Answer:

Multiple choice?

Step-by-step explanation:

Geometry 15 pts
answer is in fractions

Line segment JM has endpoints with coordinates 0 and 25 on a number line. Points K and L are on segment JM. K has a coordinate of 5 and point L has a coordinate of 12. Find the probability that a point on JM is placed first on JL and a second point is not placed on KL.

Answers

Answer:

On a Number Line, if only whole numbers are marked

Points J, M, K, and L are marked, having coordinates 0, 25, 5, and 12.

Two points are again marked on the number line.

Probability,that a point on J M is placed first on J L

= There are 10 natural numbers in between J L and 12 natural numbers between L M.

So, Required Probability

$=\frac{_(1)^(C)\textrm{10}*_(1)^(C)\textrm{12}}{_(1)^(C)\textrm{25}*_(1)^(C)\textrm{25}}\n\n=(10*12)/(25*25)\n\n=(120)/(625)\n\n=(24)/(125)$

Now, Probability that second point is not placed on KL, it means that point is either is on J K or L M.

There are 4 natural number between 0 and 5 and 12 natural number between L and M.

Probability of marking second point on J M is

$=\frac{_(1)^(C)\textrm{4}*_(1)^(C)\textrm{12}}{_(1)^(C)\textrm{25}*_(1)^(C)\textrm{25}}\n\n=(4*12)/(25*25)\n\n=(48)/(625)$

Probability of marking two points on the number line, with given condition is

$=(120)/(625)+(48)/(625)\n\n=(168)/(625)$

If you consider ,points on the number line which are real numbers, then we can't find the required Probability that is marking two points on the line segment.

216/225 is the answer

PLEASE HELP FAST!!!Which quadratic function contains the ordered pairs (−1,4), (0,3), and (1,4)?

Answers

Answer:

The 1st one

Step-by-step explanation:

I would explain but you said u need help fast

The first one

It is correct

Which interval contains a local minimum for the graphed function?

Answers

The question would be SO much easier to answer if we could
SEE the graphed function, or even just its equation.

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