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06.01.2021 •
Mathematics
The range of f(x) = |x| is y ≥ 0. If a < 0 and b ≠ 0 for g(x) = a|x| + b, what is the range of function g?
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Ответ:
Step-by-step explanation:
We are given that
f(x)=|x|
The range of f(x) is![y\geq 0](/tpl/images/1015/2984/d945b.png)
If a<0 and b is not equal to 0
g(x)=a|x|+b
We have to find the range of g.
Substitute x=0
g(0)=b
Substitute x=10
Then, g(10)=10a+b
Where a is negative
The range of g(x) is![(-\infty,b]](/tpl/images/1015/2984/f686b.png)
Ответ:
divide 936 by 12=78
use long multiplication to evaluate=11232
use long addition to evaluate=948
use long subtraction to evaluate=924