we conclude that if the scale factor from S to M is 3/2, then the scale factor from M to S is 2/4.
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</h3><h3>What is the scale factor from M to S?</h3>
Suppose we have a figure S. If we apply a stretch of scale factor K to our figure S, we can say that all the dimensions of figure S are multiplied by K.
So, if S represents the length of a bar, then after the stretch we will get a bar of length M, such that:
M = S*K
If that scale factor is 3/2, then we have the case of the problem:
M = (3/2)*S
We can isolate S in the above relation:
(2/3)*M = S
Now we have an equation (similar to the first one) that says that the scale factor from M to S is 2/3.
Then we conclude that if the scale factor from S to M is 3/2, then the scale factor from M to S is 2/4.
If you want to learn more about scale factors:
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Answer:
Step-by-step explanation:
The remainder theorem says that when you put the integer part of the binomial for the value of x in f(x), you can solve for the remainder.
f(x) = x^3 - 4x + k is divided by (x - 5) means that 5 is put into f(x)
f(5) = x^3 - 4x + k now put 5 into x on the right
f(5) = 5^3 - 4(5) + k
f(5) = 125 - 20 + k = 91
f(5) = 105 + k = 91
105 + k = 91 Subtract 105 from both sides
k = 91 - 105
k = -14
Answer:
The first true university, that is an institution called as such, was founded in Bologna, Italy in 1088. The Latin phrase 'universitas magistrorum et scholarium' indicated an association of teachers and scholars. As this early date, universities were more of an association or a guild for learning particular crafts.
Answer:
-5/13
Step-by-step explanation:
I don' treally sure if it correct
To find the area of a rectangle you just multiply the width by the length so 1.3 times 7 = 9.1
