what are the quadrant sign properties of inverse trigonometric functions?
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Answers
Answer:
he inverse cos, sec, and cot functions will return values in the I and II Quadrants, and the inverse sin, csc, and tan functions will return values in the I and IV Quadrants (but remember that you need the negative values in Quadrant IV
Explanation:
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Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½.
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluate
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluatearcsin ½
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluatearcsin ½"The angle whose sine is ½."
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluatearcsin ½"The angle whose sine is ½."The function
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluatearcsin ½"The angle whose sine is ½."The functiony = arcsin x
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluatearcsin ½"The angle whose sine is ½."The functiony = arcsin xis called the inverse of the funtion
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluatearcsin ½"The angle whose sine is ½."The functiony = arcsin xis called the inverse of the funtiony = sin x.
Inversely, if we are given that the value of the sine function is ½, then the challenge is to name the radian angle x.sin x = ½."The sine of what angle is equal to ½?"We write however: Evaluatearcsin ½"The angle whose sine is ½."The functiony = arcsin xis called the inverse of the funtiony = sin x.arcsin x is the angle whose sine is the number x.