According to your graphing calculator what is the approximate solution to the trigonometric inequality tan(x/4)<1/5 over the interval 0<= x<=2pi radians

0<=x<0.7896
0<=x<0.9799
0<=x<0.9870
0<=x<1.2249

Inequality is a sort of equation in which the equal sign is missing. As we will see, inequality is defined as a statement regarding the relative magnitude of two claims.

Given inequality;

tan(x/4)<1/5

x/4 = tan⁻¹(1/5)

0<=x<0.7896

The approximate solution to the trigonometric inequality will be 0<=x<0.7896.

Hence option A is correct.

To learn more about inequity, refer to https://brainly.com/question/20383699

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According to your graphing calculator what is the approximate solution to the trigonometric inequality tan(x/4)<1/5 over the interval 0<= x<=2pi radians ￼ 0<=x<0.7896 0<=x<0.9799 0<=x<0.9870 0<=x<1.2249

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What is the definition of inequality?

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According to your graphing calculator what is the approximate solution to the trigonometric inequality tan(x/4)<1/5 over the interval 0<= x<=2pi radians

0<=x<0.7896
0<=x<0.9799
0<=x<0.9870
0<=x<1.2249