Answer:
D
Step-by-step explanation:
This is an example of the Pythagorean theorem.
In triangle BEH, the sum of the squares of the sides of the two smaller sides, BE and BH is equal to the longest side squared, EH.
 
        
             
        
        
        
The total area of the complete lawn is (100-ft x 200-ft) = 20,000 ft².
One half of the lawn is  10,000 ft².  That's the limit that the first man 
must be careful not to exceed, lest he blindly mow a couple of blades 
more than his partner does, and become the laughing stock of the whole
company when the word gets around.  10,000 ft² ... no mas !
When you think about it ... massage it and roll it around in your 
mind's eye, and then soon give up and make yourself a sketch ... 
you realize that if he starts along the length of the field, then with 
a 2-ft cut, the lengths of the strips he cuts will line up like this:
First lap:
       (200 - 0) = 200 
       (100 - 2) = 98
       (200 - 2) = 198
       (100 - 4) = 96     
Second lap:
       (200 - 4) = 196
       (100 - 6) = 94 
       (200 - 6) = 194
       (100 - 8) = 92    
Third lap:
       (200 - 8) = 192
       (100 - 10) = 90
       (200 - 10) = 190
       (100 - 12) = 88  
These are the lengths of each strip.  They're 2-ft wide, so the area 
of each one is (2 x the length).  
I expected to be able to see a pattern developing, but my brain cells 
are too fatigued and I don't see it.  So I'll just keep going for another 
lap, then add up all the areas and see how close he is:
Fourth lap:
       (200 - 12) = 188
       (100 - 14) = 86
       (200 - 14) = 186
       (100 - 16) = 84  
So far, after four laps around the yard, the 16 lengths add up to 
2,272-ft, for a total area of 4,544-ft².  If I kept this up, I'd need to do 
at least four more laps ... probably more, because they're getting smaller 
all the time, so each lap contributes less area than the last one did.
Hey ! Maybe that's the key to the approximate pattern !
Each lap around the yard mows a 2-ft strip along the length ... twice ... 
and a 2-ft strip along the width ... twice.  (Approximately.)  So the area 
that gets mowed around each lap is (2-ft) x (the perimeter of the rectangle), 
(approximately), and then the NEXT lap is a rectangle with 4-ft less length 
and 4-ft less width.
So now we have rectangles measuring
         (200 x 100),  (196 x 96),  (192 x 92),  (188 x 88),  (184 x 84) ... etc.
and the areas of their rectangular strips are 
           1200-ft², 1168-ft², 1136-ft², 1104-ft², 1072-ft² ... etc.
==> I see that the areas are decreasing by 32-ft² each lap.
       So the next few laps are  
               1040-ft², 1008-ft², 976-ft², 944-ft², 912-ft² ... etc.  
How much area do we have now:
             After 9 laps,    Area =   9,648-ft²
             After 10 laps,  Area = 10,560-ft².
And there you are ... Somewhere during the 10th lap, he'll need to 
stop and call the company surveyor, to come out, measure up, walk 
in front of the mower, and put down a yellow chalk-line exactly where 
the total becomes 10,000-ft².    
There must still be an easier way to do it.  For now, however, I'll leave it 
there, and go with my answer of:  During the 10th lap. 
        
             
        
        
        
Answer:
A) 2x*2 +6x -3x - 9= 2x*2 +3x -9
B) 2yx*2 +2yx +2y +3x*2 +3x +3 
C) 36x*2 y +48yx +3xy*2 + 4y*2
D) 2x*3 - 4x*2 y + 3x -6y
 
        
             
        
        
        
Given:  <span>f(x) = log3 (x + 1), look for f^-1 (2)
We are looking for the inverse of a function. The inverse of the function can be obtained by switching the variables and obtaining the values of the new function, before substituting f(2). Using a calculator:
</span><span>f^-1 (2) = 8</span>