Answer
Find out the which system of equations could you use to determine how much each weighs .
To prove
As given
Horatio weighs three times as much as Kimberly.
together they weigh a total of 95 kilograms .
h = represents Horatio's weight .
k = represents Kimberly's weight.
As
Horatio weighs three times as much as Kimberly .
Horatio weighs becomes (h) = 3k
Than the equation becomes
h + k = 95
put h = 3k in the above equation
3k + k = 95
4k = 95
[tex]k = \frac{95}{4}[/tex]
k = 23.75 kilogram
Put in the equation
h = 3k
= 3 × 23.75
= 71.25 kilogram
Therefore the weight of the Horatio's is 71.25 kilogram.
and the weight of the Horatio's is 23.75 kilogram.
Answer:
Find out the which system of equations could you use to determine how much each weighs .
To prove
As given
Horatio weighs three times as much as Kimberly.
together they weigh a total of 95 kilograms .
h = represents Horatio's weight .
k = represents Kimberly's weight.
As
Horatio weighs three times as much as Kimberly .
Horatio weighs becomes (h) = 3k
Than the equation becomes
h + k = 95
put h = 3k in the above equation
3k + k = 95
4k = 95
k = 23.75 kilogram
Put in the equation
h = 3k
= 3 × 23.75
= 71.25 kilogram
Therefore the weight of the Horatio's is 71.25 kilogram.
and the weight of the Horatio's is 23.75 kilogram.
Step-by-step explanation:
