Answer:
The another number will be [tex]-(\frac{97}{33})[/tex]
Step-by-step explanation:
Let us consider one rational number be x and another rational number given is [tex]-(\frac{22}{97})[/tex]
The product of two rational numbers is [tex]\frac{198}{297} .[/tex]
So,
[tex]-(\frac{22}{97})\cdot x=\frac{198}{297} \\ \\ \frac{-22x}{97}=\frac{198}{297}[/tex]
By cross multiplication,
[tex]-22x \cdot297=97 \cdot 198\\ \\ (-22 \cdot 297)x=97 \cdot 198\\ \\ x=\frac{97 \cdot 198}{-22 \cdot 297} =-(\frac{97 \cdot 9}{297})=-(\frac{97}{33})[/tex]
The product of two rational numbers is 198/297 if one of the number is 22/-97 find the other. solution
2.93939394 change this into fraction
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Answers & Comments
Answer:
The another number will be [tex]-(\frac{97}{33})[/tex]
Step-by-step explanation:
Let us consider one rational number be x and another rational number given is [tex]-(\frac{22}{97})[/tex]
The product of two rational numbers is [tex]\frac{198}{297} .[/tex]
So,
[tex]-(\frac{22}{97})\cdot x=\frac{198}{297} \\ \\ \frac{-22x}{97}=\frac{198}{297}[/tex]
By cross multiplication,
[tex]-22x \cdot297=97 \cdot 198\\ \\ (-22 \cdot 297)x=97 \cdot 198\\ \\ x=\frac{97 \cdot 198}{-22 \cdot 297} =-(\frac{97 \cdot 9}{297})=-(\frac{97}{33})[/tex]
Answer:
The product of two rational numbers is 198/297 if one of the number is 22/-97 find the other. solution
Step-by-step explanation:
2.93939394 change this into fraction