Show that the rational numbers -15/35 and 4/(-6) are not equal? Please it is urgent
Answers
Answer:
Given (-9/12) and (8/-12)
The standard form of (-9/12) is (-3/4) [on diving the numerator and denominator of given number by their HCF i.e. by 3]
The standard form of (8/-12) = (-2/3) [on diving the numerator and denominator of given number by their HCF i.e. by 4]
Since, the standard forms of two rational numbers are not same. Hence, they are not equal.
(ii) Given (-16/20) and (20/-25)
Multiplying numerator and denominator of (-16/20) by the denominator of (20/-25)
i.e. -25.
(-16/20) × (-25/-25) = (400/-500)
Now multiply the numerator and denominator of (20/-25) by the denominator of
(-16/20) i.e. 20
(20/-25) × (20/20) = (400/-500)
Clearly, the numerators of the above obtained rational numbers are equal.
Hence, the given rational numbers are equal
(iii) Given (-7/21) and (3/-9)
Multiplying numerator and denominator of (-7/21) by the denominator of (3/-9)
i.e. -9.
(-7/21) × (-9/-9) = (63/-189)
Now multiply the numerator and denominator of (3/-9) by the denominator of
(-7/21) i.e. 21
(3/-9) × (21/21) = (63/-189)
Clearly, the numerators of the above obtained rational numbers are equal.
Hence, the given rational numbers are equal
(iv) Given (-8/-14) and (13/21)
Multiplying numerator and denominator of (-8/-14) by the denominator of (13/21)
i.e. 21
(-8/-14) × (21/21) = (-168/-294)
Now multiply the numerator and denominator of (13/21) by the denominator of
(-8/-14) i.e. -14
(13/21) × (-14/-14) = (-182/-294)
Clearly, the numerators of the above obtained rational numbers are not equal.
Hence, the given rational numbers are also not equal