(x) = 900x - 0.1x^2
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,therefore the vertex of the parabola will give us the number of computer units we need to sell to get maximum profit in pesos
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,therefore the vertex of the parabola will give us the number of computer units we need to sell to get maximum profit in pesosif you have not studied calculus, then x is given by
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,therefore the vertex of the parabola will give us the number of computer units we need to sell to get maximum profit in pesosif you have not studied calculus, then x is given byx = -b/2a where b = 900 and a = -0.1
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,therefore the vertex of the parabola will give us the number of computer units we need to sell to get maximum profit in pesosif you have not studied calculus, then x is given byx = -b/2a where b = 900 and a = -0.1x = -900 / (2*(-0.1)) = 4500 units
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,therefore the vertex of the parabola will give us the number of computer units we need to sell to get maximum profit in pesosif you have not studied calculus, then x is given byx = -b/2a where b = 900 and a = -0.1x = -900 / (2*(-0.1)) = 4500 unitsif you have studied calculus, then we take the first derivative and set it equal to 0 and solve for x
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,therefore the vertex of the parabola will give us the number of computer units we need to sell to get maximum profit in pesosif you have not studied calculus, then x is given byx = -b/2a where b = 900 and a = -0.1x = -900 / (2*(-0.1)) = 4500 unitsif you have studied calculus, then we take the first derivative and set it equal to 0 and solve for x0 = 900 - (2*0.1)x
(x) = 900x - 0.1x^2this is a quadratic equation whose graph is a parabola that curves downward,therefore the vertex of the parabola will give us the number of computer units we need to sell to get maximum profit in pesosif you have not studied calculus, then x is given byx = -b/2a where b = 900 and a = -0.1x = -900 / (2*(-0.1)) = 4500 unitsif you have studied calculus, then we take the first derivative and set it equal to 0 and solve for x0 = 900 - (2*0.1)xx = -900 / (-2*0.1) = 4500 units
