The first thing you must do is to calculate the weight of the gravel (w) that the truck holds (7.5 yards³). So, you have:
If the weight of 1 yard³ is 1.48 tons, then the weight of 7.5 yards³ is:
w=7.5x1.48 tons
w=11.1 tons
The problem says that the gravel will be placed in containers that each hold 3.7 tons of gravel,so, If they need 1 cotainer to place 3.7 tons, how many containers they need to place 11.1 tons?
1 container-------3.7 tons of gravel
x-------11.1 tons of gravel
x=(11.1x1)/3.7
x=11.1/3.7
x=3 containers
H<span>ow many containers of this size are needed to hold all the gravel from one truck?
</span>
The answer is: 3 containers.
25 because Becky read 45 and Jason read 20
45-20 = 25
Answer:
(-8,4)
Step-by-step explanation:
Given: 2x-3y=-28 and x+6y=16
solve for a variable and then substitute back into other equation
x + 6y = 16
x = 16 - 6y; now use this in the other equation
2x - 3y = -28; substitute into x
2(16 - 6y) - 3y = -28; distribute 2
32 - 12y - 3y = -28; combine y's
32 - 15y = -28; isolate 15y
32 + 28 = 15y; add the numbers
60 = 15y; divide by 15
y = 4
Now use this to plug into other equation
x + 6y = 16; y=4
x + 6(4) = 16;
x + 24 = 16; subtract 24 from both sides
x = -8
Answer:
Step-by-step explanation:
<h3>Given information</h3>
<h3>Question 15. f(g(2))</h3>
<u>Substitute values into the first function</u>
<u>Substitute the values of the first function into the second</u>
<h3>Question 16. g(f(2.5))</h3>
<u>Substitute values into the first function</u>
<u />
<u>Substitute the values of the first function into the second</u>
<h3>Question 17. g(f(-5))</h3>
<u>Substitute values into the first function</u>
<u>Substitute the values of the first function into the second</u>
<h3>Question 18. f(g(-5))</h3>
<u>Substitute values into the first function</u>
<u>Substitute the values of the first function into the second</u>
Hope this helps!! :)
Please let me know if you have any questions
I dont think that it belongs in primary consumers, secondary or third level consumers
