How do you write the equation #alpha=sinbeta# in the form of an inverse function? Trigonometry Inverse Trigonometric Functions Inverse Trigonometric Properties 1 Answer Shwetank Mauria Dec 23, 2016 In the form of an inverse function #alpha=sinbeta# can be written as #beta=sin^(-1)alpha# or #beta=arcsinalpha# Answer link Related questions How do you use the properties of inverse trigonometric functions to evaluate #tan(arcsin (0.31))#? What is #\sin ( sin^{-1} frac{sqrt{2}}{2})#? How do you find the exact value of #\cos(tan^{-1}sqrt{3})#? How do you evaluate #\sec^{-1} \sqrt{2} #? How do you find #cos( cot^{-1} sqrt{3} )# without a calculator? How do you rewrite #sec^2 (tan^{-1} x)# in terms of x? How do you use the inverse trigonometric properties to rewrite expressions in terms of x? How do you calculate #sin^-1(0.1)#? How do you solve the inverse trig function #cos^-1 (-sqrt2/2)#? How do you solve the inverse trig function #sin(sin^-1 (1/3))#? See all questions in Inverse Trigonometric Properties Impact of this question 1546 views around the world You can reuse this answer Creative Commons License