Question
In a company, the sales are represented as where x is the number of products manufactured. The production is represented as .
By solving the equation, we get (0, 2000) and (8, 8040008)
It is given manufactured some products, so x =0 is ignored
We consider x=8
How many products must be manufactured to get appropriate sales?
- 5
- 7
- 8
- 6
The correct answer is: 8
simply x= 8 is the answer
Related Questions to study
By seeing the graph, find the number of solutions.
By seeing the graph, find the number of solutions.
By seeing the graph, find the solution.
By seeing the graph, find the solution.
Write the equation as system of equations?
Write the equation as system of equations?
When a watermelon is launched into the air, it forms a parabola and the line equation of the watermelon launcher to the land is y=300 x.
How far does the watermelon is launched?
When a watermelon is launched into the air, it forms a parabola and the line equation of the watermelon launcher to the land is y=300 x.
How far does the watermelon is launched?
A company has launched two products in the same month. The sales of the two products are the same in a particular month. The sales of the first product are and the sales of the second product are .
In which month do the sales are same?
A company has launched two products in the same month. The sales of the two products are the same in a particular month. The sales of the first product are and the sales of the second product are .
In which month do the sales are same?
In a test series two different batsmen scored y runs in the same match, x denotes the number of innings. Batsman A scored y = x2 + 3, batsman b scored y = 3x + 3.
How many runs does batsman B scored?
In a test series two different batsmen scored y runs in the same match, x denotes the number of innings. Batsman A scored y = x2 + 3, batsman b scored y = 3x + 3.
How many runs does batsman B scored?
By seeing the graph, find the solutions.
By seeing the graph, find the solutions.
The solutions to systems of equations are the variable mappings such that all component equations are satisfied—in other words, the locations at which all of these equations intersect.
The solutions to systems of equations are the variable mappings such that all component equations are satisfied—in other words, the locations at which all of these equations intersect.
In a football match, the equation of the kick is recorded as .
How much height did the ball go after the kick?
Determining the Maximum Value of the Quadratic Equation
For instance, it can be stated that if the equation has been represented in the form of ax2 +bx+c, the formula for finding the maximum value will be max= c- (b2/4a).
In a football match, the equation of the kick is recorded as .
How much height did the ball go after the kick?
Determining the Maximum Value of the Quadratic Equation
For instance, it can be stated that if the equation has been represented in the form of ax2 +bx+c, the formula for finding the maximum value will be max= c- (b2/4a).
In a football match, the equation of the kick is recorded as .
How far did the ball go after the kick?
If a trinomial is in the form ax 2 + bx + c is said to be a perfect square, if and only if it satisfies the condition b 2 = 4ac.
In a football match, the equation of the kick is recorded as .
How far did the ball go after the kick?
If a trinomial is in the form ax 2 + bx + c is said to be a perfect square, if and only if it satisfies the condition b 2 = 4ac.
In a basketball match, the equation of the kick is recorded as .
How much height did the ball go after the kick?
In a basketball match, the equation of the kick is recorded as .
How much height did the ball go after the kick?
In a basketball match, the equation of the kick is recorded as . How far did the ball go after the kick.
If a trinomial is in the form ax 2 + bx + c is said to be a perfect square, if and only if it satisfies the condition b 2 = 4ac.
In a basketball match, the equation of the kick is recorded as . How far did the ball go after the kick.
If a trinomial is in the form ax 2 + bx + c is said to be a perfect square, if and only if it satisfies the condition b 2 = 4ac.