anong kaibahan ng pantay sa patas
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Answer:
pantay sakto lang
patas nakakalamang
Answer:
Answer:-
\red{\bigstar}★ Age of Kriti's Father \large\leadsto\boxed{\tt\green{25 \: years}}⇝25years
\red{\bigstar}★ Age of Kriti \large\leadsto\boxed{\tt\green{5 \: years}}⇝5years
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• Given:-
Kriti's father's age is 5 times as old as Kriti.
After 5 years father will be three times in as old as Kriti.
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• To Find:-
The present ages of Kriti and her father.
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• Solution:-
Let the age of Kriti's father be 'x' and that of Kriti be 'y'.
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Given that,
Kriti's father's age is 5 times as old as Kriti.
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Therefore,
➪ \sf x= 5y \dashrightarrow\bf\red{[eqn.i]}x=5y⇢[eqn.i]
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Also,
After 5 years father will be 3 times as old as Kriti.
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Therefore,
➪ \sf x+5 = 3(y+5)x+5=3(y+5)
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➪ \sf x+5 = 3y + 15x+5=3y+15
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➪ \sf x - 3y = 15 - 5x−3y=15−5
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➪ \sf x - 3y = 10 \dashrightarrow\bf\red{[eqn.ii]}x−3y=10⇢[eqn.ii]
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• Substituting eqn.[i] in eqn.[ii]:-
➪ \sf x - 3y = 10x−3y=10
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➪ \sf (5y) - 3y = 10(5y)−3y=10
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➪ \sf 5y - 3y = 105y−3y=10
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➪ \sf 2y = 102y=10
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➪ \sf y = \dfrac{10}{2}y=210
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★ \large\underline{\underline{\bf\pink{y = 5}}}y=5
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• Substituting value of y in eqn.[i]:-
➪ \sf x = 5yx=5y
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➪ \sf x = 5 \times 5x=5×5
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★ \large\underline{\underline{\bf\pink{x = 25}}}x=25
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Therefore, the ages are:-
Father = 25 years
Kriti = 5 years