The value of X where X = (1 + APR/M)^M - 1. assume APR = 8.00% And M = 4.00 is 1.061208
<h3>How to determine the value of x?</h3>
The formula is given as:
X = (1 + APR/M)^M - 1
Where
APR = 8.00%
M = 4.00
Substitute the above values in the formula X = (1 + APR/M)^M - 1
So, we have
X = (1 + 8%/4)^4- 1
Evaluate the difference and the quotient
X = (1 + 0.02)^3
Evaluate the sum
X = (1.02)^3
Evaluate the exponent
X = 1.061208
Hence, the value of X where X = (1 + APR/M)^M - 1. assume APR = 8.00% And M = 4.00 is 1.061208
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The value of the probability P(E and F) is 0.2802
<h3>Independent probability</h3>
Events are known to be independent if the occurrence of one does not affect the other.
Given the following parameters
P (E) =0.471
P(F) = 0.595
If E and F are independent, then;
P(E and F) = P(E)P(F)
P(E and F) = 0.471 * 0.595
P(E and F) = 0.2802
Hence the value of the probability P(E and F) is 0.2802
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4g/cm^3
D = M/V
100g/25cm^3 = 4g/cm^3
<span>4.8 (x+4)=2.6
Use distributive property
4.8x + 19.2= 2.6
Subtract 19.2 from both sides
4.8x = -16.6
Divide 4.8 on both sides so that the only thing remaining on the left side is the variable x.
Final Answer: x = -3.458</span>
