As written this is not a graphable thing. I does not represent a graphable equation because there is no "=" sign. Whatever the equation might be, the x intercept is found by setting y=0, which leaves you with an equation for x, which is the intercept.
The answer depends on what information you are given - and in what form. If the equation of the curve is given in polar coordinates or in parametric form, the process is quite different to that required when given the Cartesian equation.
The y-intercept (or y-intercepts) of an equation is where x = 0. Replace x with zero in the equation, and solve for y.The answer depends on what information you are given - and in what form. If the equation of the curve is given in polar coordinates or in parametric form, the process is quite different to that required when given the Cartesian equation.
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To determine atleast one short of all variables by means of given conditions.
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As written this is not a graphable thing. I does not represent a graphable equation because there is no "=" sign. Whatever the equation might be, the x intercept is found by setting y=0, which leaves you with an equation for x, which is the intercept.
An equation has an equals sign ( = ). Equations assert the absolute equality of two expressions.
That depends on the equation.
The answer depends on what information you are given - and in what form. If the equation of the curve is given in polar coordinates or in parametric form, the process is quite different to that required when given the Cartesian equation.
Substitute the coordinates of the point into the equation of the line. If the equation is still valid then the point is on the line; if not then it is not.
The y-intercept (or y-intercepts) of an equation is where x = 0. Replace x with zero in the equation, and solve for y.The answer depends on what information you are given - and in what form. If the equation of the curve is given in polar coordinates or in parametric form, the process is quite different to that required when given the Cartesian equation.
Calculate the equation based on the following given assumption • Demand is given by the equation: Qd = 200 – P • Supply is given by the equation: Qs = 100 + P • A competitive equilibrium exists a. Determine the equilibrium price and quantity of housing, given the above information. b. Assume a tax on housing of 10 units ($10,000 if you like) is introduced. Determine the new quantity of housing exchanged and the new price received by producers. c. Determine the deadweight loss that results from this tax.
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To determine atleast one short of all variables by means of given conditions.
How about that when given a quadratic equation what would you use to determine whether or not it has any solutions.
The reactants in the equation determine what product you get.