Respuesta :
Step-by-step explanation:
Checking Option F:
[tex]sin\left(3x+2\right)\:=\:cos\left(x+8\right)[/tex]
Checking x = 11° in above equation
[tex]sin\left(3\left(11\right)+2\right)=cos\left(11+\:8\right)[/tex]
[tex]\sin \left(35\right)=\cos \left(11^{\circ \:}+8\right)[/tex]
[tex]\sin \left(35^{\circ \:}\right)=\cos \left(19^{\circ \:}\right)[/tex]
[tex]\mathrm{The\:sides\:are\:not\:equal}[/tex]
[tex]False[/tex]
Checking x = 79° in above equation
[tex]sin\left(3\left(79\right)+2\right)\:=\:cos\left(79+8\right)[/tex]
[tex]\sin \left(239\right)=\cos \left(79^{\circ \:}+8\right)[/tex]
[tex]\sin \left(239\right)=\cos \left(79^{\circ \:}+8\right)[/tex]
[tex]\mathrm{The\:sides\:are\:not\:equal}[/tex]
[tex]False[/tex]
Checking Option G:
Checking x = 20° in above equation
[tex]sin\left(3\left(20\right)+2\right)\:=\:cos\left(20+8\right)[/tex]
[tex]\sin \:\left(62\right)=\cos \:\left(28\right)[/tex]
The sides are not equal
False
Checking x = 70° in above equation
[tex]sin\left(3\left(70\right)+2\right)\:=\:cos\left(70+8\right)[/tex]
[tex]\sin \left(212\right)=\cos \left(70^{\circ \:}+8\right)[/tex]
The sides are not equal
False
Checking Option H:
Checking x = 44° in above equation
[tex]sin\left(3\left(44\right)+2\right)\:=\:cos\left(44+8\right)[/tex]
[tex]\sin \left(134\right)=\cos \left(44^{\circ \:}+8\right)[/tex]
The sides are not equal
False
Checking x = 46° in above equation
[tex]sin\left(3\left(46\right)+2\right)\:=\:cos\left(46+8\right)[/tex]
[tex]\sin \left(140\right)=\cos \left(46^{\circ \:}+8\right)[/tex]
The sides are not equal
False
Checking Option J:
Checking x = 62° in above equation
[tex]sin\left(3\left(62\right)+2\right)\:=\:cos\left(62+8\right)[/tex]
[tex]\sin \left(188\right)=\cos \left(62^{\circ \:}+8\right)[/tex]
The sides are not equal
False
Checking x = 28° in above equation
[tex]sin\left(3\left(28\right)+2\right)\:=\:cos\left(28+8\right)[/tex]
[tex]\sin \left(86\right)=\cos \left(28^{\circ \:}+8\right)[/tex]
The sides are not equal
False
Therefore, NO TWO angles satisfy the equation
sin(3x + 2) = cos(x + 8).
Answer:
J, 62°, 28°
Step-by-step explanation:
Since the principles of sine and cosine are based upon right triangles, the two angles have to be complementary, adding up to 90. Thereby, in your equation, (3x+2) + (x+8) = 90. Combining like terms gives you:
4x + 10 = 90 subtract 10 from both sides
- 10 -10
4x = 80 divide both sides by 4
4 4
x = 20 plug that back into both angles
3x+2 = 3(20) + 2 = 62°
x+8 = 20+8 = 28°
Answer is J 62°, 28°
