the hcf and the lcm of two numbers are 9 and 360 respectivily if one number is 45 find another number
Answers
Solution:
By formula
\mathrm{H} \cdot \mathrm{C} . \mathrm{F} \times \mathrm{L} . \mathrm{C} . \mathrm{M}H⋅C.F×L.C.M of two numbers = product of the two numbers
\mathrm{H} \cdot \mathrm{C} \cdot \mathrm{F} \times \mathrm{L} \cdot \mathrm{C} \cdot \mathrm{M}=9 \times 360H⋅C⋅F×L⋅C⋅M=9×360
Given in question, one of the numbers is 45
Let the another number be x
Therefore, substituting the terms in the above formula,
\begin{gathered}\begin{array}{l}{9 \times 360=45 \times x} \\ {x=\frac{9 \times 360}{45}} \\ {x=72}\end{array}\end{gathered}
9×360=45×x
x=
45
9×360
x=72
Answer:
Step-by-step explanation:
The other number is 72
Given:
H .C .F of two numbers are 9 and 360
To Find:
The other number
Solution:
By formula
h.c.f × l.c.m of two numbers = product of the two numbers
h.c.f × l.c.m =9×360
Given in question, one of the numbers is 45
Let the another number be x
Therefore, substituting the terms in the above formula,
9×360=45×X
X=9×360/45
X=72