Answer:
219 sheets
Explanation:
D = 5000 per year,
d = daily demand = 5000/365 = 13.70 sheets
T = time between orders (review) = 14 days
L = Lead time = 10 days
σd= Standard deviation of daily demand = 5 per day
I = Current Inventory = 150 sheets Service Level
P = 95% (Probability of not stocking out) q=d(L+D)z σ T+L-1
σ T+L-1= square root (T+L)=5 square root 14+10= 24.495
From Standard normal distribution, z = 1.64 for 95% Service Level (or 5% Stock out)
q=13.70*(14+10)+1.64(24.495)-150
= 218.97 →219 sheets
Answer:
C-chart is the best suited for this since it is widely used to determine if the defects or returns are within the control limits or not.
Mean = average = 8 per day
Z=3
UcL = mean + 3[square root of mean]= 8+ 3 (Sq root of 8) = 16.48
LcL= mean - 3[ square foot of mean] = - 0.485
So the returns are within the control limits.
Two Types of Goods Return:
Purchases Return or Return outward.
Sales Return or Return inward.
Purchases Return Goods
For Examples :
Purchases goods from Mrs. Kuheli Rs. 2000
Answer:
Pay
Explanation:
Auto liability insurance helps offset the costs of bodily injuries and property damages to the other driver. The principle applies if you are the one at fault in the of an accident.
Auto liability insurance coverage is mandatory by law. It covers the medical expenses of the other party. In some circumstances, it may cover lost wages and legal fees in case the other party files a lawsuit. It also covers the repair or replacement cost of the other drivers' car.
Answer:
The YTM is less than 10%
Explanation:
If a coupon rate of a bond is greater than its yield to maturity (YTM), the bond is said to trade at a premium. The Bond's current price would be greater than its Face value
If a coupon rate of a bond is less than its yield to maturity (YTM), the bond is said to trade at a discount. The bonds current price would be less than its face value
In this Question, the bond's current price ($1,197.93) is greater than its face
($1,000) which means that the bond is trading at a premium. Therefore, we can conclude that the bond's YTM is less than its coupon payment. In this question the coupon rate is 10%, therefore the YTM should be less than 10%.