Answer:
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Solve the Function Operation
Use the given functions to set up and simplify
140
.
350
m
e
t
e
r
s
=
350
m
t
e
2
r
s
140
=
350
m
t
e
2
r
s
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Find the Exact Value
The chosen topic is not meant for use with this type of problem. Try the examples below.
csc
(
60
)
sin
(
330
)
cos
(
390
)
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Identify the Sequence
Use the formula
a
n
=
a
1
+
d
(
n
−
1
)
to identify the arithmetic sequence.
a
n
=
700
m
t
e
2
r
s
+
140
n
−
140
−
350
m
t
e
2
r
s
n
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Simplify
Simplify the expression.
157.68432
m
4
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Simplify the expression.
157.68432
m
4
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Simplify the expression.
157.68432
m
4
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Not the answer you were looking for?
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Solve the Function Operation
Simplify
0.9
⋅
(
0.2
m
)
⋅
(
6.9
m
)
⋅
(
13.8
m
)
⋅
(
9.2
m
)
.
157.68432
m
4
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Simplify
0.9
⋅
(
0.2
m
)
⋅
(
6.9
m
)
⋅
(
13.8
m
)
⋅
(
9.2
m
)
.
157.68432
m
4
Answer:
if u need help go to math way
.
Step-by-step explanation:
math way is a good way to get the steps and answer to ur problem.
Answer:
(-18,4) is 16 units below (-18,20). hope this helps
Step-by-step explanation:
- Zombie
Hi!
<h3>
Your answer is the first option, 0.17.</h3>
To solve this, we will have to do a few things.
- Solve for the area of the triangle
- Solve for the area of the rectangle
- Find what percent the area of the triangle is of the area of the rectangle
<h3><u>
STEP ONE</u></h3>
<u>Area of a triangle:</u> 
Use the given values to plug it into the formula:
The area of the triangle is 12 centimeters squared.
<h3><u>
STEP TWO</u></h3>
<u>Area of a rectangle:</u> 
Use the given values to plug it into the formula:
The area of the rectangle is 70 centimeters squared.
<h3><u>
STEP THREE</u></h3><h3 />
To do this step, we must divide the area of the triangle by the area of the rectangle.
This will give us the percent that the triangle is of the rectangle, and hence will give us the probability of it landing inside of the rectangle.
So:
<em>Therefore, the probability that a point chosen randomly inside the rectangle is in the triangle is 0.17.</em>
