Answer:
The original duration of the tour is 18 days.
Step-by-step explanation:
Let
the number of days spent be T
Daily expenses be D
Initially ,
total tour expenses was 360
[tex]D \times T=360[/tex]
[tex]D = \frac{360}{T}[/tex]-------------(1)
If he extends his tour for 4 days, he has to cut down his daily expenses by dollar 3
[tex](D + 4) \cdot(T -3) = 360[/tex]---------------(2)
Expanding the eqaution(2)
DT-3D + 4T -12 = 360
Substituting the value of D
[tex](\frac{360}{T})T -3( \frac{360}{T}) + 4T -12 = 360[/tex]
[tex](\frac{360}{T})T -3( \frac{360}{T}) + 4T= 360 + 12[/tex]
[tex](\frac{360}{T})T -3( \frac{360}{T}) + 4T= 372[/tex]
[tex]360 - ( \frac{1080}{T}) + 4T= 372[/tex]
[tex] ( \frac{1080}{T}) + 4T= 372 - 360 [/tex]
[tex] ( \frac{1080}{T}) + 4T= 12 [/tex]
[tex] 1080 + 4T^2= 12T [/tex]
Solving the quadratic equation we get
T = 18 and T = -15
T is the number of gays and it cannot be negative , hence T is 18
Substituting in equation (1) we get
[tex]D = \frac{360}{18}[/tex]
D = 20
