The following policies would bring the economy to potential output is Decrease government spending by $10 billion.
<h3>
What is Marginal Propensity?</h3>
The "Marginal Propensity" to consume is defined as calculate quantification of money that consumers are ready to spend.
The term "Marginal propensity" to consume is term used in economics. It measures monetary value which consumer is willing to spend to buy goods and services instead of saving it.
The "Marginal Propensity" to consume tends to increase economic activities of country by keeping cash flowing and by not keeping it stagnant. It also helps in increasing trade value and quality and cost of products because it increases healthy competition among companies and in which consumers are ultimately benefitted.
Therefore , we can conclude that the correct option is C.
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Answer:
$3,500
Explanation:
Placing a stop-loss order at $165 means that the last amount that the stock traded, it had a price of $165 per share.
Based on that, it is evident that each stock has lost $35 when compared to the price at which the stop-loss order was placed and the initial cost per share of $200.
Loss per share=$200-$165=$35
The loss incurred on 100 shares of IBM=loss per share*number of shares owned
The loss incurred on 100 shares of IBM=$35*100
The loss incurred on 100 shares of IBM=$3,500
Answer:
The correct option is A, true
Explanation:
The predetermined overhead absorption rate is a forecast overhead rate usually computed by estimated total factory overhead by the planned usage or capacity of the unit of the activity.
This is more like planning ahead for the overhead to be incurred, hence the correct option is A , which truly supported that the statement made in the question
Answer:
€928.46
Explanation:
Since it was hinted that bonds issued outside of the United States pay coupons annually, it is expected that the bonds issued in Germany pay annual coupons, and its price is computed below using the bond price formula, excel PV function, and financial calculator:
Bond price=face value/(1+r)^n+annual coupon*(1-(1+r)^-n/r
face value=€1,000
r=yield to maturity=8.7%
n=number of annual coupons in 10 years=10
annual coupon=face value*coupon rate=€1,000*7.6%=€76
bond price=1000/(1+8.7%)^10+76*(1-(1+8.7%)^-10/8.7%
bond price=1000/(1.087)^10+76*(1-(1.087)^-10/0.087
bond price=1000/2.30300797+76*(1-0.43421474)/0.087
bond price=1000/2.30300797+76*0.56578526/0.087
bond price= 434.21+494.25= €928.46
Excel PV function:
=-pv(rate,nper,pmt,fv)
=-pv(8.7%,10,76,1000)
pv=€928.46
Financial calculator:
N=10
PMT=76
I/Y=8.7
FV=1000
CPT PV=€928.46
