Find the domain and range of the function $f(x) =sqrt{csc(3x)}$












0















Find the domain of and range of the function f(x) ,and express your
answer in interval form $f(x)=sqrt{csc(3x)}$




I got the domain, like how its restricted and $sin(x)$ can't equal to zero. However, I'm stuck on the range part of the question. I'm not sure how to do it. I got 0 ≤ $sqrt{csc(3x)}$ ≤ 1, which is wrong when I checked online graphing calculator



This is a review question for University Calculus.










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  • hint: $csc(3x)$ goes to infinity when $x$ approaches 0
    – Vasya
    Sep 20 '17 at 13:13










  • Welcome to MSE. Please use MathJax.
    – José Carlos Santos
    Sep 20 '17 at 13:16










  • you can make a plot of your function!
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:36










  • see here wolframalpha.com/input/?i=plot+sqrt(csc(3*x))+for+x%3D-2+to+2
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:47
















0















Find the domain of and range of the function f(x) ,and express your
answer in interval form $f(x)=sqrt{csc(3x)}$




I got the domain, like how its restricted and $sin(x)$ can't equal to zero. However, I'm stuck on the range part of the question. I'm not sure how to do it. I got 0 ≤ $sqrt{csc(3x)}$ ≤ 1, which is wrong when I checked online graphing calculator



This is a review question for University Calculus.










share|cite|improve this question
























  • hint: $csc(3x)$ goes to infinity when $x$ approaches 0
    – Vasya
    Sep 20 '17 at 13:13










  • Welcome to MSE. Please use MathJax.
    – José Carlos Santos
    Sep 20 '17 at 13:16










  • you can make a plot of your function!
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:36










  • see here wolframalpha.com/input/?i=plot+sqrt(csc(3*x))+for+x%3D-2+to+2
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:47














0












0








0








Find the domain of and range of the function f(x) ,and express your
answer in interval form $f(x)=sqrt{csc(3x)}$




I got the domain, like how its restricted and $sin(x)$ can't equal to zero. However, I'm stuck on the range part of the question. I'm not sure how to do it. I got 0 ≤ $sqrt{csc(3x)}$ ≤ 1, which is wrong when I checked online graphing calculator



This is a review question for University Calculus.










share|cite|improve this question
















Find the domain of and range of the function f(x) ,and express your
answer in interval form $f(x)=sqrt{csc(3x)}$




I got the domain, like how its restricted and $sin(x)$ can't equal to zero. However, I'm stuck on the range part of the question. I'm not sure how to do it. I got 0 ≤ $sqrt{csc(3x)}$ ≤ 1, which is wrong when I checked online graphing calculator



This is a review question for University Calculus.







trigonometry






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share|cite|improve this question













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share|cite|improve this question








edited Sep 20 '17 at 13:34









Abcd

3,01521134




3,01521134










asked Sep 20 '17 at 13:08









Dospalke

22




22












  • hint: $csc(3x)$ goes to infinity when $x$ approaches 0
    – Vasya
    Sep 20 '17 at 13:13










  • Welcome to MSE. Please use MathJax.
    – José Carlos Santos
    Sep 20 '17 at 13:16










  • you can make a plot of your function!
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:36










  • see here wolframalpha.com/input/?i=plot+sqrt(csc(3*x))+for+x%3D-2+to+2
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:47


















  • hint: $csc(3x)$ goes to infinity when $x$ approaches 0
    – Vasya
    Sep 20 '17 at 13:13










  • Welcome to MSE. Please use MathJax.
    – José Carlos Santos
    Sep 20 '17 at 13:16










  • you can make a plot of your function!
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:36










  • see here wolframalpha.com/input/?i=plot+sqrt(csc(3*x))+for+x%3D-2+to+2
    – Dr. Sonnhard Graubner
    Sep 20 '17 at 13:47
















hint: $csc(3x)$ goes to infinity when $x$ approaches 0
– Vasya
Sep 20 '17 at 13:13




hint: $csc(3x)$ goes to infinity when $x$ approaches 0
– Vasya
Sep 20 '17 at 13:13












Welcome to MSE. Please use MathJax.
– José Carlos Santos
Sep 20 '17 at 13:16




Welcome to MSE. Please use MathJax.
– José Carlos Santos
Sep 20 '17 at 13:16












you can make a plot of your function!
– Dr. Sonnhard Graubner
Sep 20 '17 at 13:36




you can make a plot of your function!
– Dr. Sonnhard Graubner
Sep 20 '17 at 13:36












see here wolframalpha.com/input/?i=plot+sqrt(csc(3*x))+for+x%3D-2+to+2
– Dr. Sonnhard Graubner
Sep 20 '17 at 13:47




see here wolframalpha.com/input/?i=plot+sqrt(csc(3*x))+for+x%3D-2+to+2
– Dr. Sonnhard Graubner
Sep 20 '17 at 13:47










2 Answers
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To determine the domain of $sqrt{csc(3x)}$, you have to first look at where $sin(3x) = 0$ and $csc(3x) < 0$. Notice that this is determined in the following manner:



$$sin(3x) =0 implies 3x = sin^{-1}(0) implies 3x = kpi, k in mathbb{Z}, implies x = frac{kpi}{3}, k in mathbb{Z}.$$ We also note that $csc(3x) < 0$ when $sin(3x) < 0$, so we see that $$sin(3x) < 0 implies pi < 3x< 2pi implies frac{pi}{3} + 2kpi < x < frac{2pi}{3} + 2kpi, k in mathbb{Z}.$$ Therefore the domain of $sqrt{csc(3x)}$ is the set of all $x in mathbb{R}$ such that $x neq frac{kpi}{3}$ and $x not in left( frac{pi}{3} + 2kpi, frac{2pi}{3} + 2kpi right)$.



To determine the range of $sqrt{csc(3x)}$ note that $$sqrt{csc(3x)} = frac{1}{sqrt{sin(3x)}}. $$ Since $sin(3x) to 0$ as $x to 0$, the function is clearly unbounded (above).



It is also worth noting that the range of the function $f(g(x))$ is the range of $f$ when restricted to the domain of $g(x)$ such that the function is well defined. Notice that $sqrt{csc(3x)}$ is the composite of $sin(3x)$ and $frac{1}{sqrt{x}}$. Therefore, the range of $sqrt{csc(3x)}$ is the range of $frac{1}{sqrt{x}}$ when restricted to the domain determined above. It so follows that the range of $sqrt{csc(3x)}$ is $[1, infty)$, since the largest value of $sin(3x)$ on the restricted domain is $1$. Hence the minimum of $sqrt{csc(3x)}$ is $sqrt{1}=1$.



Hope this helps.



I disagree with the comments made by Dr. Sonnhard Graubner. One should not be forced to rely on graphical techniques. While the student should be able to graph this type of functions, a purely analytic solutions should be able to be provided.






share|cite|improve this answer































    0














    Assuming the function is real-valued:



    $f(x)=sqrt{csc(3x)}$



    For the expression $sqrt{a}$ to be defined, we need $age0$. Thus, $csc(3x)ge0$.



    Since $csc(x)=frac{1}{sin(x)}$, we also need $sin(3x)ne0Leftrightarrow3xne ncdotpiLeftrightarrow xne ncdotfrac{pi}{3}, ninmathbb{Z}$



    Now $csc(3x)ge0$ iff $sin(3x)ge0$



    We know $sin(x)ge0$ iff $xinleft[2npi;(2n+1)piright], ninmathbb{Z}$



    Then $sin(3x)ge0$ iff $xinleft[frac{2n}{3}pi;frac{2n+1}{3}piright], ninmathbb{Z}$



    Combining these two restrictions yields the Domain $D={xinmathbb{R}colon exists ninmathbb{Z}left(xinleft(frac{2n}{3}pi;frac{2n+1}{3}piright)right)}$



    As seen above, for this domain the expression $sin(3x)$ takes on the values in the interval $(0;1]$



    Then $csc(3x)=frac{1}{sin(3x)}$ takes on values in the interval $[1;+infty)$



    Finally, this means that $sqrt{csc(3x)}$ will take on values in the interval $[1;+infty)$, meaning that the range is $R={xinmathbb{R}colon xge1}$



    Note: Knowing the sines periodic behavior we can see that $f(x)$ behaves the same in any interval $left(frac{2n}{3}pi;frac{2n+1}{3}piright)$ for any $ninmathbb{Z}$ and will take on all the values in its range in any of these intervals.






    share|cite|improve this answer





















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      2 Answers
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      2 Answers
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      0














      To determine the domain of $sqrt{csc(3x)}$, you have to first look at where $sin(3x) = 0$ and $csc(3x) < 0$. Notice that this is determined in the following manner:



      $$sin(3x) =0 implies 3x = sin^{-1}(0) implies 3x = kpi, k in mathbb{Z}, implies x = frac{kpi}{3}, k in mathbb{Z}.$$ We also note that $csc(3x) < 0$ when $sin(3x) < 0$, so we see that $$sin(3x) < 0 implies pi < 3x< 2pi implies frac{pi}{3} + 2kpi < x < frac{2pi}{3} + 2kpi, k in mathbb{Z}.$$ Therefore the domain of $sqrt{csc(3x)}$ is the set of all $x in mathbb{R}$ such that $x neq frac{kpi}{3}$ and $x not in left( frac{pi}{3} + 2kpi, frac{2pi}{3} + 2kpi right)$.



      To determine the range of $sqrt{csc(3x)}$ note that $$sqrt{csc(3x)} = frac{1}{sqrt{sin(3x)}}. $$ Since $sin(3x) to 0$ as $x to 0$, the function is clearly unbounded (above).



      It is also worth noting that the range of the function $f(g(x))$ is the range of $f$ when restricted to the domain of $g(x)$ such that the function is well defined. Notice that $sqrt{csc(3x)}$ is the composite of $sin(3x)$ and $frac{1}{sqrt{x}}$. Therefore, the range of $sqrt{csc(3x)}$ is the range of $frac{1}{sqrt{x}}$ when restricted to the domain determined above. It so follows that the range of $sqrt{csc(3x)}$ is $[1, infty)$, since the largest value of $sin(3x)$ on the restricted domain is $1$. Hence the minimum of $sqrt{csc(3x)}$ is $sqrt{1}=1$.



      Hope this helps.



      I disagree with the comments made by Dr. Sonnhard Graubner. One should not be forced to rely on graphical techniques. While the student should be able to graph this type of functions, a purely analytic solutions should be able to be provided.






      share|cite|improve this answer




























        0














        To determine the domain of $sqrt{csc(3x)}$, you have to first look at where $sin(3x) = 0$ and $csc(3x) < 0$. Notice that this is determined in the following manner:



        $$sin(3x) =0 implies 3x = sin^{-1}(0) implies 3x = kpi, k in mathbb{Z}, implies x = frac{kpi}{3}, k in mathbb{Z}.$$ We also note that $csc(3x) < 0$ when $sin(3x) < 0$, so we see that $$sin(3x) < 0 implies pi < 3x< 2pi implies frac{pi}{3} + 2kpi < x < frac{2pi}{3} + 2kpi, k in mathbb{Z}.$$ Therefore the domain of $sqrt{csc(3x)}$ is the set of all $x in mathbb{R}$ such that $x neq frac{kpi}{3}$ and $x not in left( frac{pi}{3} + 2kpi, frac{2pi}{3} + 2kpi right)$.



        To determine the range of $sqrt{csc(3x)}$ note that $$sqrt{csc(3x)} = frac{1}{sqrt{sin(3x)}}. $$ Since $sin(3x) to 0$ as $x to 0$, the function is clearly unbounded (above).



        It is also worth noting that the range of the function $f(g(x))$ is the range of $f$ when restricted to the domain of $g(x)$ such that the function is well defined. Notice that $sqrt{csc(3x)}$ is the composite of $sin(3x)$ and $frac{1}{sqrt{x}}$. Therefore, the range of $sqrt{csc(3x)}$ is the range of $frac{1}{sqrt{x}}$ when restricted to the domain determined above. It so follows that the range of $sqrt{csc(3x)}$ is $[1, infty)$, since the largest value of $sin(3x)$ on the restricted domain is $1$. Hence the minimum of $sqrt{csc(3x)}$ is $sqrt{1}=1$.



        Hope this helps.



        I disagree with the comments made by Dr. Sonnhard Graubner. One should not be forced to rely on graphical techniques. While the student should be able to graph this type of functions, a purely analytic solutions should be able to be provided.






        share|cite|improve this answer


























          0












          0








          0






          To determine the domain of $sqrt{csc(3x)}$, you have to first look at where $sin(3x) = 0$ and $csc(3x) < 0$. Notice that this is determined in the following manner:



          $$sin(3x) =0 implies 3x = sin^{-1}(0) implies 3x = kpi, k in mathbb{Z}, implies x = frac{kpi}{3}, k in mathbb{Z}.$$ We also note that $csc(3x) < 0$ when $sin(3x) < 0$, so we see that $$sin(3x) < 0 implies pi < 3x< 2pi implies frac{pi}{3} + 2kpi < x < frac{2pi}{3} + 2kpi, k in mathbb{Z}.$$ Therefore the domain of $sqrt{csc(3x)}$ is the set of all $x in mathbb{R}$ such that $x neq frac{kpi}{3}$ and $x not in left( frac{pi}{3} + 2kpi, frac{2pi}{3} + 2kpi right)$.



          To determine the range of $sqrt{csc(3x)}$ note that $$sqrt{csc(3x)} = frac{1}{sqrt{sin(3x)}}. $$ Since $sin(3x) to 0$ as $x to 0$, the function is clearly unbounded (above).



          It is also worth noting that the range of the function $f(g(x))$ is the range of $f$ when restricted to the domain of $g(x)$ such that the function is well defined. Notice that $sqrt{csc(3x)}$ is the composite of $sin(3x)$ and $frac{1}{sqrt{x}}$. Therefore, the range of $sqrt{csc(3x)}$ is the range of $frac{1}{sqrt{x}}$ when restricted to the domain determined above. It so follows that the range of $sqrt{csc(3x)}$ is $[1, infty)$, since the largest value of $sin(3x)$ on the restricted domain is $1$. Hence the minimum of $sqrt{csc(3x)}$ is $sqrt{1}=1$.



          Hope this helps.



          I disagree with the comments made by Dr. Sonnhard Graubner. One should not be forced to rely on graphical techniques. While the student should be able to graph this type of functions, a purely analytic solutions should be able to be provided.






          share|cite|improve this answer














          To determine the domain of $sqrt{csc(3x)}$, you have to first look at where $sin(3x) = 0$ and $csc(3x) < 0$. Notice that this is determined in the following manner:



          $$sin(3x) =0 implies 3x = sin^{-1}(0) implies 3x = kpi, k in mathbb{Z}, implies x = frac{kpi}{3}, k in mathbb{Z}.$$ We also note that $csc(3x) < 0$ when $sin(3x) < 0$, so we see that $$sin(3x) < 0 implies pi < 3x< 2pi implies frac{pi}{3} + 2kpi < x < frac{2pi}{3} + 2kpi, k in mathbb{Z}.$$ Therefore the domain of $sqrt{csc(3x)}$ is the set of all $x in mathbb{R}$ such that $x neq frac{kpi}{3}$ and $x not in left( frac{pi}{3} + 2kpi, frac{2pi}{3} + 2kpi right)$.



          To determine the range of $sqrt{csc(3x)}$ note that $$sqrt{csc(3x)} = frac{1}{sqrt{sin(3x)}}. $$ Since $sin(3x) to 0$ as $x to 0$, the function is clearly unbounded (above).



          It is also worth noting that the range of the function $f(g(x))$ is the range of $f$ when restricted to the domain of $g(x)$ such that the function is well defined. Notice that $sqrt{csc(3x)}$ is the composite of $sin(3x)$ and $frac{1}{sqrt{x}}$. Therefore, the range of $sqrt{csc(3x)}$ is the range of $frac{1}{sqrt{x}}$ when restricted to the domain determined above. It so follows that the range of $sqrt{csc(3x)}$ is $[1, infty)$, since the largest value of $sin(3x)$ on the restricted domain is $1$. Hence the minimum of $sqrt{csc(3x)}$ is $sqrt{1}=1$.



          Hope this helps.



          I disagree with the comments made by Dr. Sonnhard Graubner. One should not be forced to rely on graphical techniques. While the student should be able to graph this type of functions, a purely analytic solutions should be able to be provided.







          share|cite|improve this answer














          share|cite|improve this answer



          share|cite|improve this answer








          edited Sep 20 '17 at 13:58

























          answered Sep 20 '17 at 13:53









          AmorFati

          391529




          391529























              0














              Assuming the function is real-valued:



              $f(x)=sqrt{csc(3x)}$



              For the expression $sqrt{a}$ to be defined, we need $age0$. Thus, $csc(3x)ge0$.



              Since $csc(x)=frac{1}{sin(x)}$, we also need $sin(3x)ne0Leftrightarrow3xne ncdotpiLeftrightarrow xne ncdotfrac{pi}{3}, ninmathbb{Z}$



              Now $csc(3x)ge0$ iff $sin(3x)ge0$



              We know $sin(x)ge0$ iff $xinleft[2npi;(2n+1)piright], ninmathbb{Z}$



              Then $sin(3x)ge0$ iff $xinleft[frac{2n}{3}pi;frac{2n+1}{3}piright], ninmathbb{Z}$



              Combining these two restrictions yields the Domain $D={xinmathbb{R}colon exists ninmathbb{Z}left(xinleft(frac{2n}{3}pi;frac{2n+1}{3}piright)right)}$



              As seen above, for this domain the expression $sin(3x)$ takes on the values in the interval $(0;1]$



              Then $csc(3x)=frac{1}{sin(3x)}$ takes on values in the interval $[1;+infty)$



              Finally, this means that $sqrt{csc(3x)}$ will take on values in the interval $[1;+infty)$, meaning that the range is $R={xinmathbb{R}colon xge1}$



              Note: Knowing the sines periodic behavior we can see that $f(x)$ behaves the same in any interval $left(frac{2n}{3}pi;frac{2n+1}{3}piright)$ for any $ninmathbb{Z}$ and will take on all the values in its range in any of these intervals.






              share|cite|improve this answer


























                0














                Assuming the function is real-valued:



                $f(x)=sqrt{csc(3x)}$



                For the expression $sqrt{a}$ to be defined, we need $age0$. Thus, $csc(3x)ge0$.



                Since $csc(x)=frac{1}{sin(x)}$, we also need $sin(3x)ne0Leftrightarrow3xne ncdotpiLeftrightarrow xne ncdotfrac{pi}{3}, ninmathbb{Z}$



                Now $csc(3x)ge0$ iff $sin(3x)ge0$



                We know $sin(x)ge0$ iff $xinleft[2npi;(2n+1)piright], ninmathbb{Z}$



                Then $sin(3x)ge0$ iff $xinleft[frac{2n}{3}pi;frac{2n+1}{3}piright], ninmathbb{Z}$



                Combining these two restrictions yields the Domain $D={xinmathbb{R}colon exists ninmathbb{Z}left(xinleft(frac{2n}{3}pi;frac{2n+1}{3}piright)right)}$



                As seen above, for this domain the expression $sin(3x)$ takes on the values in the interval $(0;1]$



                Then $csc(3x)=frac{1}{sin(3x)}$ takes on values in the interval $[1;+infty)$



                Finally, this means that $sqrt{csc(3x)}$ will take on values in the interval $[1;+infty)$, meaning that the range is $R={xinmathbb{R}colon xge1}$



                Note: Knowing the sines periodic behavior we can see that $f(x)$ behaves the same in any interval $left(frac{2n}{3}pi;frac{2n+1}{3}piright)$ for any $ninmathbb{Z}$ and will take on all the values in its range in any of these intervals.






                share|cite|improve this answer
























                  0












                  0








                  0






                  Assuming the function is real-valued:



                  $f(x)=sqrt{csc(3x)}$



                  For the expression $sqrt{a}$ to be defined, we need $age0$. Thus, $csc(3x)ge0$.



                  Since $csc(x)=frac{1}{sin(x)}$, we also need $sin(3x)ne0Leftrightarrow3xne ncdotpiLeftrightarrow xne ncdotfrac{pi}{3}, ninmathbb{Z}$



                  Now $csc(3x)ge0$ iff $sin(3x)ge0$



                  We know $sin(x)ge0$ iff $xinleft[2npi;(2n+1)piright], ninmathbb{Z}$



                  Then $sin(3x)ge0$ iff $xinleft[frac{2n}{3}pi;frac{2n+1}{3}piright], ninmathbb{Z}$



                  Combining these two restrictions yields the Domain $D={xinmathbb{R}colon exists ninmathbb{Z}left(xinleft(frac{2n}{3}pi;frac{2n+1}{3}piright)right)}$



                  As seen above, for this domain the expression $sin(3x)$ takes on the values in the interval $(0;1]$



                  Then $csc(3x)=frac{1}{sin(3x)}$ takes on values in the interval $[1;+infty)$



                  Finally, this means that $sqrt{csc(3x)}$ will take on values in the interval $[1;+infty)$, meaning that the range is $R={xinmathbb{R}colon xge1}$



                  Note: Knowing the sines periodic behavior we can see that $f(x)$ behaves the same in any interval $left(frac{2n}{3}pi;frac{2n+1}{3}piright)$ for any $ninmathbb{Z}$ and will take on all the values in its range in any of these intervals.






                  share|cite|improve this answer












                  Assuming the function is real-valued:



                  $f(x)=sqrt{csc(3x)}$



                  For the expression $sqrt{a}$ to be defined, we need $age0$. Thus, $csc(3x)ge0$.



                  Since $csc(x)=frac{1}{sin(x)}$, we also need $sin(3x)ne0Leftrightarrow3xne ncdotpiLeftrightarrow xne ncdotfrac{pi}{3}, ninmathbb{Z}$



                  Now $csc(3x)ge0$ iff $sin(3x)ge0$



                  We know $sin(x)ge0$ iff $xinleft[2npi;(2n+1)piright], ninmathbb{Z}$



                  Then $sin(3x)ge0$ iff $xinleft[frac{2n}{3}pi;frac{2n+1}{3}piright], ninmathbb{Z}$



                  Combining these two restrictions yields the Domain $D={xinmathbb{R}colon exists ninmathbb{Z}left(xinleft(frac{2n}{3}pi;frac{2n+1}{3}piright)right)}$



                  As seen above, for this domain the expression $sin(3x)$ takes on the values in the interval $(0;1]$



                  Then $csc(3x)=frac{1}{sin(3x)}$ takes on values in the interval $[1;+infty)$



                  Finally, this means that $sqrt{csc(3x)}$ will take on values in the interval $[1;+infty)$, meaning that the range is $R={xinmathbb{R}colon xge1}$



                  Note: Knowing the sines periodic behavior we can see that $f(x)$ behaves the same in any interval $left(frac{2n}{3}pi;frac{2n+1}{3}piright)$ for any $ninmathbb{Z}$ and will take on all the values in its range in any of these intervals.







                  share|cite|improve this answer












                  share|cite|improve this answer



                  share|cite|improve this answer










                  answered Sep 20 '17 at 14:01









                  Thorgott

                  544314




                  544314






























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