800 liter sama dengan brapa liter
Answer (3)
By setting up a system of equations based on the total number of animals and the total number of legs, we can solve for the number of chickens and rabbits. Using substitution, we found there are 7 chickens and 9 rabbits on the farm.
The problem at hand involves determining how many chickens and how many rabbits there are based on the information provided about the total number of animals and the total number of legs. This is a typical example of a system of linear equations problem in algebra. We'll define two variables, C for the number of chickens and R for the number of rabbits.
Since we know there are 16 animals in total, we can write the first equation as: C + R = 16.
As for the number of legs, chickens have 2 legs each and rabbits have 4 legs each. This allows us to create another equation: 2C + 4R = 50.
To solve the system, we can use substitution or elimination. We will use the substitution method here:
We'll solve the first equation for C : C = 16 - R.
Substitute C in the second equation: 2(16 - R) + 4R = 50
Simplify and solve for R : 32 - 2R + 4R = 50 2R = 50 - 32 2R = 18 R = 9
Now substitute R = 9 back into the first equation to find C : C = 16 - 9 C = 7
Therefore, there are 7 chickens and 9 rabbits on this farm.
By setting up and solving a system of equations, we find that there are 7 chickens and 9 rabbits on the farm. The total number of animals is 16 and the total number of legs is 50. Using substitution, we solved the equations step-by-step.
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Jawaban:800 liter sama dengan 800 liter
