Answer:
males = 7
females = 43
Explanation:
whilst it may seem intuitive to simply subtract 36 from 50, it is not saying "there are 36 males, how many females?" but instead, "the difference between the number of males and females is 36".
You can solve this equation most easily algebraically. For example:
Number of males = x
number of females = y
the question states that the total number of people = 50
therefore we can say that the total number of males (x) + the total number of females (y) = 50 people
therefore: x + y = 50
similarly, the question says that the number of males (x) + 36 = the total number of females (y)
therefore: x + 36 = y
we now have two equations:
x + y = 50
x + 36 = y
whilst both equations have two unknowns (x and y), therefore we can't simple solve for x or y, with the combination, we can see a pattern.
focusing on the second equation: x + 36 = y
we can add x to both sides, because you can pretty much do anything to the equation as long as you do it to both sides.
x + 36 + x = y + x
now this may seem very random, but you now see that one side of the equation equals y + x, and remember from the other equation, x + y = 50. Therefore we can substitute x + y in the second equation for 50.
our two equations:
x + 36 + x = y + x
x + y = 50
therefore:
x + 36 + x = 50
for the sake of clarity, we can combine like terms...
x + x = 2x
therefore:
x + 36 + x = 50
2x + 36 = 50
solve for x by subtracting 36 from both sides, then dividing both sides by 2
2x + 36 - 36 = 50 - 36
2x = 14
2x / 2 = 14 / 2
x = 7
now remember:
Number of males = 7 (we now know x = 7)
now that we've solved for x, we can go back to our original equation:
x + 36 = y
and substitute x...
7 + 36 = y
43 = y
Now remember:
Number of females = 43 (we now know y = 43)
therefore there are 7 males and 43 females. we can proof this by adding 7 and 43, and you'll see you reach 50, which is the correct total number of people.
hope this helps :)