Calculating Tammy's Displacement

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Tammy's total displacement from the office is calculated by first determining her movements: she drives 26 km north and then 62 km at 30 degrees north of east. The calculations involve breaking down her journey into components, resulting in a net displacement of 53.7 km east and 57 km north. Using the Pythagorean theorem, the total displacement is found to be approximately 78.3 km. An alternative method using the cosine law also confirms this displacement value.
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Tammy leaves the office, drives 26 km due north, then turns onto a 2nd highway and continues in a direction of 30.0 degrees north of east for 62 km. What is her total displacement from the office?
The triangle I drew:
|\
|' \ a
|b \
|___\
a = 62 km
b = 26 km
' = 30 degrees
 
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You seem to have her going southeast instead of northeast as it should be.
 
^ah...right. thanks.

Would Dnet x = 62 cos 30 = 53.7 km
Then Dnet y = 26 km + 62 cos 30 = 57 km
Then total displacement:
sqrt(53.7^2 + 57^2) = 78.3 km?
 
Last edited:
Yep, that's one way to do it. You could also use the cosine law.

x = [26^2 + 62^2 - 2(26)(62)(cos 120)] ^ .5
x = 78.3
 

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