The answer is "C", "MW".
In the given problem, the place QMW and plane RMW. These planes intersect at MW, in which intersection is either a point, line or curve that an entity or entities both possess or is in contact with but if we see in Euclidean<span> geometry, the intersection of two planes is called a “line”. </span>In the plane we can understand that the common line for both plane QMW and plane RMW is MW.
Answer:
Answers will be down below
Step-by-step explanation:
A. 733
B. 53,899
C. 583
D. 38,257
E. 3,525
F. 423
G. 737
H. 44
I. 537
J. 964
Answer:
Step-by-step explanation:
Combine all the like terms & then solve:
A(b-c)=d
We are trying to leave c on one side, so we have to divide by a on both sides first to get
b-c=d/a
now we can subtract by b on both sides to get
-c=d/a-b
now multiply both sides by -1 to get
<span>c=-d/a+b</span>
The answer would be...2 x 1 1/2....sorry if I'm wrong! :)
