SOLUTION: Julia, who is 1.51 m tall, wishes to find the height of a tree with a shadow 31.05 m long. She walks 20.70 m from the base of the tree along the shadow of the tree until her head i

Algebra ->  Problems-with-consecutive-odd-even-integers -> SOLUTION: Julia, who is 1.51 m tall, wishes to find the height of a tree with a shadow 31.05 m long. She walks 20.70 m from the base of the tree along the shadow of the tree until her head i      Log On


   

Question 302213: Julia, who is 1.51 m tall, wishes to find the height of a tree with a shadow 31.05 m long. She walks 20.70 m from the base of the tree along the shadow of the tree until her head is in a position where the tip of her shadow exactly overlaps the end of the tree top's shadow. How tall is the tree? Round to the nearest hundredth
Answer by ankor@dixie-net.com(22740) About Me  (Show Source):
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Julia, who is 1.51 m tall, wishes to find the height of a tree with a shadow 31.05 m long.
She walks 20.70 m from the base of the tree along the shadow of the tree until
her head is in a position where the tip of her shadow exactly overlaps the end of the tree top's shadow.
How tall is the tree? Round to the nearest hundredth.
:
We can use the property of two similar triangles. Corresponding sides have same ratios.
:
the triangle formed by the tree, it's shadow, and line to the sun
is similar to:
the triangle formed by the person, her shadow, and line to the sun
:
let t = height of the tree
tree shadow given as 31.05 m
;
person height = 1.51 m
person shadow: 31.05 - 20.70 = 10.35 m
:
A simple ratio equation using corresponding sides of each triangle
tree height:person height = tree shadow:person shadow
t%2F1.51 = 31.05%2F10.35
Cross multiply
10.35t = 1.51*31.05
10.35t = 46.8855
t = 46.8855%2F10.35
t = 4.53 m is the height of the tree
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