(1) Solve \( \frac{x}{2} + \frac{ {x}^{3} }{1} = \sqrt{4x} + 5 \) <br> §§V0(1,50,.1)§§ + §§V1(100)§§ = §§(§§V0(1,50,.1)§§ + §§V1(100)§§)§§ <br> <p> (2) §§N0§§, §§Fm1§§ and §§M2§§ love to collect candy! </p> <p>On Monday, §§N0§§ collected §§V0(1,20,1)§§ gummy bears. On Tuesday, §§Fm1§§ collected §§V1(2,10,2)§§ chocolate coins. On Wednesday, §§M2§§ collected §§V1(1,10,1)§§ lollipops. On Thursday, they all decided to share their candy. <p> <p>(a) How many gummy bears and chocolate coins did §§N0§§ and §§Fm1§§ have together?</p> <p> (Show your work: ___ + ___ = ___ )</p> <p>(b) If §§M2§§ gave 3 of his lollipops to §§Fm1§§, how many lollipops would §§M2§§ have left?</p> <p>(Show your work: ___ - ___ = ___) </p> <p>(3) §§V2(-5,0,.25)§§ + \( \int_{0}^{1} \frac{x}{1+x^2} \, dx = \frac{1}{2} \ln(1+x^2) \Big|_{0}^{1} = \frac{1}{§§V1(10)§§} (\ln 2 - \ln 1) = \frac{1}{2} \ln 2 \) </p>