Answer:
2: 3, 4: 6, 6: 9, 8: 12 , 10: 15, 12: 18, 14: 21, 16: 24, 18: 27, 20: 30, 22: 33, 24:36, 26: 39, 28: 42, 30: 45, 32: 48, 34: 51, 36: 54, 38: 57
Step-by-step explanation:
The ratio 4: 6 can be simplified to 2:3 by dividing by 2 to each side of the ratio. After simplified to 2:3, you add the ration to itself to get the rest of the terms.
Answer:
The expressions that show the value of q are
1) 
2) 
3) 
4) 
5) 
Step-by-step explanation:
see the attached figure to better understand the problem
we know that
case A)
In the right triangle of the figure
Applying the Pythagoras Theorem


case B)
In the right triangle of the figure

solve for q

case C)
In the right triangle of the figure

solve for q

case D)
In a right triangle
if 
then

therefore
------> 
------> 
Answer:
Rational
Step-by-step explanation:
A rational number is a number with two or fewer integers.
-51/5 = -5.2
I hope this helped and if it did I would appreciate it if you marked me Brainliest. Thank you and have a nice day!
Answer:
i do just text my account
Step-by-step explanation:
Step-by-step explanation:
area = ½ (a+b) x h
500in² = ½ (16+24) x h
500in² = ½ (40) x h
500in² = 20 x h
<u>500in²</u>
20 = h
h = 25 inches :)