Answer: 9/110
Step-by-step explanation:
11*20=220
3*3/2*4=18
18/220=9/110
Answer:
I'm pretty sure the answer is 40
Step-by-step explanation:
I added the 16 on both sides to the 48 and then divided it by 2. Hope this helps. I'm learning the same thing and the struggle is real but i like this site and we will get better. :)
Answer:
Therefore the one combination is
200 tickets of Children and 100 tickets of Adult.
Therefore Total Amount will be given as
..........As Required
Step-by-step explanation:
Given:
Children's tickets cost = 5$ (per ticket)
Adult tickets cost = 10$ (per ticket)
Total Amount = 2000$
Let the number of Children's Ticket be " x "
and the number of Adult's Ticket be " y "
Therefore,
Total cost for Children's Ticket will be =
Total cost for Adult's Ticket will be =
Therefore Total Amount will be given as
...........As Required
So there are many combinations to get 2000$ one of the as follow
Children's tickets cost = 1000$
∴
Adult's tickets cost = 1000$
Therefore the one combination is
200 tickets of Children and 100 tickets of Adult.
For the first question, we need two angles sitting on the line. We do not know if segments EG and AB are perpendicular, so cannot assume, even though they look like it.
A. DGB and EGA do not even have one leg common, so cannot be supplementary. so no.
B. DGB and CGB together add up to angle DGC which we know is a straight line. so yes.
C. CGB and AGD are vertical angles, and nothing tells us any of them is a right angle, so no.
D. EGA and EGC make an angle between segments CD and AB. so no.
E. EGD and CGB could be supplementary if we know CGB=EGC. But since we don't, so no.
For the second question, yes, you're right, take the second option in both, i.e. rotate 90 degrees (i.e. counterclockwise) about A, followed by a reflection about y, then translate downwards 20 units will give exactly GHIJ.
The fourth, rotate about B 90 degrees, then reflect about y-axis and translate down 25 is close, but need another translation (2,-1) to fit in the right place.
Answer:
There are no real solutions to this equation
Step-by-step explanation: