Does the function f(x)=x^3-4x^2x-6/x-3 have a slant asymptote? If so, find an equation of the slant asymptote. If not, explain
Does the function f(x)=x^3-4x^2x-6/x-3 have a slant asymptote? If so, find an equation of the slant asymptote. If not, explain
answer rather than having to add and subtract the measurements of the semi-circle, notice that the semicircle to the left of ad is actually identical in area to the blank semicircle-shaped space to the left of bc. so if we transferred the red semicircle into the blank space, we would end up with a square of side length 24 cm. the area of a square is s^2 = 24^2 = 676 cm^2.
u also answered this so i think u would know but i am here to
put in or use mine
[tex]For the figures below, assume they are made of semicircles, quarter circles and squares. for each sh[/tex]
first option
a function is a relation in which an input is paired with exactly one output.
so, let's find the right answer.
in our first option, our inputs are january, february, and march. the outputs are 30, 28, and 25. each input has it's own output. this is correct!
our second option we know is incorrect, because ms. valverade has two outputs, dogs and cats. this is not a function.
our third option is incorrect as well. the yellow square has two ouputs, the square and the triangle.
lastly, in our fourth option, we see the number 7 two times with a different output. therefore, this is not a function.
remember: each input must be paired with only one output!
[tex]Me? ! with this question which relationship is a function?[/tex]
Bis your answer rot d
[tex]Ill give brainliest me what is the difference in revenue between the company with the greatest re[/tex]
in mathematics, a constraint is a condition of an optimization problem that the solution must satisfy. there are several types of constraints—primarily equality constraints, inequality constraints, and integer constraints. the set of candidate solutions that satisfy all constraints is called the feasible set.
hoped i'm right lol