m<1=23
m<2=90
m<3=67
m<4=113
m<5=67
the square means it is 90° so 2 is 90°.
all of the angles combined equals 360 so.
360-67-90= 203
since there is a straight line splitting down the middle. m<4=180-67=113
so m<4=113
now you would go 360-67-113-90=90 so
m<1 + m<3 =90
180-90-67=23.
m<1=23
360-67-23-90-113=67
m<3=67
Answer:
1: Mean: 48.5
Median: 37
Mode: 87 (it occurs twice)
Range: 95
2. Mean: 13.6
Median: 14
Mode: No mode
Range: 24
3. Mean: 53.1
Median: 52
Mode: 86 and 24 (they both occur twice)
Range: 78
4. Mean: 28.5
Median: 24.5
Mode: No Mode
Range: 51
To get the Mean, add the numbers, then divide them by how many there are. Example: 3+6+3 = 12 divided by 3 (since there are three numbers) equals 4.
To get the median arrange the numbers in ascending order. The median is the value in the middle. If the number of values is an even number, the median will be the average of the two middle numbers.
For Mode: find the number that occurs the most. Example: 20,5, 3, 2, 3.
The mode is 3 because it occurs twice.
For range: Subtract the lowest value from the highest value.
Hope this helps!
Answer:
y= 16
Step-by-step explanation:
For numerator 3 to become 12, the numerator and denominator must be multiplied by 4. 3x4=12 and 4x4=16. this claim is correct since 3/4 = 12/16. Taking this into consideration the value of Y is the same as the value of the second denominator.
The congruent statement and the reason why the triangles are congruent is (b) ΔUVZ ≅ ΔVYX, SSS
<h3>How to determine the congruent statement and the reason?</h3>
From the question, we have the following parameters that can be used in our computation:
Triangles = UVZ and VYX
There are several theorems that make any two triangles to be congruent
One of these theorems is the SSS congruent theorem
The SSS congruent theorem implies that the corresponding sides of the triangles in question are congruent
From the question, we can see that the following corresponding sides on the triangles UVZ and VYX have the same mark
UV and VY
UZ and VX
VZ and YX
This implies that these sides are congruent sides
Hence, the congruent statement on the congruency of the triangles is (b) ΔUVZ ≅ ΔVYX and the reason is by SSS
Read more about congruent triangles at
brainly.com/question/1675117
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