Pre-Calc/Trig Unit 2: Circular Functions/4.3 Graphs of Tan//Cot Graph cot function Select the appropriate graph for this function.

y = #a cotan #b x

]]> 1.0000000 0.3333333 0 true true ABCD #g1

]]> #g2

]]> #g3

]]> Graph not given

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s3</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><pi/><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>cotan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>*</mo><mi>cotan</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>)</mo><mo>*</mo><mi>cotan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g3</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s3</mi><mo>,</mo><mi>f3</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Graph tan function Select the appropriate graph for this function.

y = #a tan #b x

]]> 1.0000000 0.3333333 0 true true ABCD #g1

]]> #g2

]]> #g3

]]> Graph not given

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s3</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><pi/><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>tan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>*</mo><mi>tan</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>)</mo><mo>*</mo><mi>tan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g3</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s3</mi><mo>,</mo><mi>f3</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Graph the function.y =  cot x  Graph the function.

y =  cot x
 ]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Graph the function.y = tan 2x Graph the function.

y = tan 2x
]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect The function graphed is of the form y = a tan bx or y = a cot bx, where b > 0. Determine the equation of the graph.


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 1.0000000 0.3333333 0 true true abc y = cot 2x Correct y = tan 2x Incorrect y = 2 cot x Incorrect y = 2 tan x Incorrect