At a local toy store, you can build your own stuffed teddy bear. You can choose from 5 colors of bears, 3 different sizes and 12
different t-shirts for the bear to wear. How many different types of bears can you make?
1 answer:
The number of different types of bears that can be made using the given is calculated through the fundamental principles of counting.
n = (number of colors)(number of sizes)(number of t-shirts)
Substituting the known values,
n = (5)(3)(12) = 180
Therefore, there are 180 different types of bears that can be made.
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Answer:
Step-by-step explanation:
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Answer:
y = √{(a - x)/2b}
Step-by-step explanation:
x=a-2by²
2by² = a - x
divide through by 2b
y² = (a - x)/2b
y = √{(a - x)/2b}
Your missing angle will be 73 degrees, because the angles all add up to 180. So you add 33 and 74 then subtract that from 180
Answer:
y ≈ 5.63
Step-by-step explanation:
m∠KLN and m∠NLM have to add up to m∠KLM
m∠KLN = 47°
m∠NLM = 16y°
m∠KLM = 137°
47 + 16y = 137
16y = 90
y = 45/8
y = 5.625
y ≈ 5.63
