Answer:x=17
Step-by-step explanation:
Answer:
m<IHE=44°
x=3 (possibly)
m<IEH=50°
Step-by-step explanation:
First of all, we can consider FG and EH parallel lines (because they are) and GE as the transversal. Because we can see this now, using the Alternate Interior Angles Theorem, we know two things:
<IFG is congruent to <IHE, and
<GIF is congruent to <IEH.
Using the Substitution Property of Equality, we can say that:
m<IHE is equal to 44°, and
m<IEH is equal to 50°.
To solve for x, I'm honestly not too sure if EI is congruent to IG, but I'm going to substitute it anyways.
Assuming they are equal,
2x-1=5 Add 1 to both sides.
<u>+1 +1</u>
2x=6 Divide 2 on both sides.
<u>/2 /2</u>
x=3
Hope this helps!! Have an awesome day :)
Answer:
To solve for y, you want to use the distributive property
First you want to distribute the 8 through the 3y-5 and the 9 through the y-5
8(3y-5)= 24y-40
9(y-5)= 9y-45
24y-40=9y-45 (get the x on one side, so first add 40 to each side)
24y=9y-5 (now subtract 9y to each side)
15y=-5 (divide both sides by 15)
y= -5/15= -1/3
Hope this helps ;)
I can't give the exact answer as the base pay and weekly hours arn't stated but here's how to solve letters in parentheses are place holders just plug in the numbers accordingly :)
Step-by-step explanation:
<em>A</em><em>.</em>
figures needed, base pay (p) total hours worked (t) half
Saturday
p÷2= the ½ in time and a half (x)
p+x= 1 hr Saturday pay (s)
s+2= r (to cover the 30m)
7:00am to 11:30am 4hr 30m
12:00pm to 4:00pm 4hr
add them
8hr 30m
(s×8)+r= how much you were paid on Saturday
Sunday
p×2= h dubble pay
Calculate how many hrs worked on Sunday and apply the same logic as for Saturday appropriately divide the time if it doesn't come out as an even hour.
Final
Add Saturday and Sunday pay together to get weekend pay.
<em>B</em><em>.</em>
Same formula hours worked times hourly pay.
Add the weekday and weekend pay together and thats pt B.
Hope this helps!
Answer:
0.05
Step-by-step explanation:
To find P(event b) you would do 1- P(not event B) which in this problem would be seen as 1-(0.95)= 0.05
