Sorbet with fresh berries is an example of a healthy dessert treat. The correct option in regards to the question given is option "A". Fresh fruits are always considered healthy. In the first case, there are fresh berries included. In the case of option "A" the ingredients have less amount of fat and so should be considered healthy. In the case of the other dessert options given, there are ingredients that have good amount of fat. Although the last option contains sliced bananas, but it is combined with ice cream. Ice cream has huge amount of fat in it.
To solve the two equations simultaneously using the substitution method we need to rearrange one of the equation to make either
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or
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the subject.
We can try in turn rearranging both equations and see which unknown term would have been easier to solve first
Equation

Making
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the subject
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, dividing each term by 2
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⇒ (Option 1)
Making
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the subject
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, multiply each term by 8 gives
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⇒ (Option 2)
Equation
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Making
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the subject

, divide each term by 3

⇒ (Option 3)
Making
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the subject
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, divide each term by 8
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⇒ (Option 4)
From all the possibilities of rearranged term, the most efficient option would have been the first option, from equation
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with
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as the subject,
Step-by-step explanation:
Is this meant to be a question?
Answer:
Q1:
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




Q2:





Q3:




Q4:







Q5:


Cancel off
:

Cancel off 

Cancel off 
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Multiply
on the numerator and denominator:

