2 Answers

Mckbrd · Answer 1 · 2021-09-07T05:19:22+0000

Answer:

D. -1 to 3

Explanation:

We have been given a function
y=1+2sin(x-11 ) . We are asked to find the range of the function.

We know that since oscillates between
and 1, that is minimum value of sin is
and maximum is 1.

The range of basic sin function is
$-1\leq \text{sin}(x-11)\leq 1$ .

Now we will multiply all sides by 2.

$-1\cdot 2\leq 2\cdot \text{sin}(x-11)\leq 1\cdot 2$

$-2\leq 2\text{sin}(x-11)\leq 2$

Now we will add 1 on all sides as:

$-2+1\leq 2\text{sin}(x-11)+1\leq 2+1$

$-1\leq 2\text{sin}(x-11)+1\leq 3$

$-1\leq f(x) \leq 3$

Therefore, the range of the given function is
[-1,3] and option D is the correct choice.

Matt Hensley · Answer 2 · 2021-09-08T16:32:40+0000

Answer:

range of the given function in Interval notation is [-1, 3]

Explanation:

i) given function is y = 1 + 2sin(x - 11)

ii) maximum of sin function is 1

iii) therefore maximum of given function
y_(max) = 1 + (2
1) = 3

iv) minimum of sin function is -1

v) therefore maximum of given function
y_(max) = 1 + (2
-1) = -1

vi) therefore the range of the given function in Interval notation is [-1,3]

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