To compute the Modified Internal Rate of Return (MIRR) for Project J, we need to calculate the present value of cash inflows and outflows separately and then determine the discount rate that equates the present value of outflows with the future value of inflows.
The cash flows for Project J are as follows:
Time 0: Initial investment: -$1,000
Time 1: Cash inflow: $300
Time 2: Cash inflow: $1,480
Time 3: Cash inflow: $500
Time 5: Cash inflow: $100
First, let's calculate the present value (PV) of outflows (the initial investment):
PV(outflows) = -$1,000 (since it's an outflow at time 0)
Next, let's calculate the future value (FV) of inflows (cash inflows at times 1, 2, 3, and 5):
FV(inflows) = $300 + $1,480 + $500 + $100 = $2,380
Now, we can use the MIRR formula to compute the MIRR statistic:
MIRR = (FV(inflows) / PV(outflows))^(1/n) - 1
Where n is the number of periods (5 in this case).
MIRR = ($2,380 / -$1,000)^(1/5) - 1
MIRR = 1.5189 - 1
MIRR = 0.5189 or 51.89%
Given that the cost of capital is 10 percent, the MIRR is higher than the cost of capital. Therefore, we would advise accepting Project J because the MIRR is greater than the cost of capital, indicating that the project is expected to generate a return higher than the required rate of return.
will mark brainleist pls help
Answer:
x = 31°
Step-by-step explanation:
the sum of the 3 angles in a triangle = 180° , that is
x + 54° + 95° = 180°
x + 149° = 180° ( subtract 149° from both sides )
x = 31°
You are preparing to buy a house. Your monthly gross income is $3,200. a. What is the maximum amount you can finance (mortgage)? (4 points)
The maximum amount you can finance is $896.
We are given that;
The monthly gross income = $3,200
Now,
28% of your gross monthly income on your mortgage, including taxes and insurance
The percentage = 28%
3200* 28/100
=32*28
=896
Therefore, by percentage the answer will be $896.
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I don’t understand thus
The true equations for the given value of x are C, D and E
solving for x in main equation3x = 5
x = 5/3
x = 1.667
Substituting x=1.667 in the equations given in the option
38.75 - 35.25 = 3.5 (False)1.667 + 2 = 3.667 (False)4/3(1.667) = 2.222 (True)9.7 + 1.667 = 11 (True)9(1.667) = 15 (True)The equations C, D and E are true for the value of x in the equation given.
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The rate of change of a population P of an environment is determined by the logistic formula
dP/dt =0.04P(1-P/20000)
where t is in years since the beginning of 2015. So P (1) is the population at the beginning of 2016. Suppose P (0) = 1000.
(a) Calculate P′(0)
(b) Use the number from the previous part to estimate the population in the middle of 2015. That is, estimate P (0.5)
(c) What assumption is made in the computation in the previous part? Use the formula given for P ′ to see whether or not the assumption is true, to within 1%
We first need to understand the logistic formula used for modeling population growth. The formula is:
P'(t) = rP(t)(1 - P(t)/K),
where P'(t) represents the rate of change of the population, P(t) is the population at time t, r is the intrinsic growth rate, and K is the carrying capacity of the environment.
(a) To calculate P'(0), we need the values for r, P(0), and K. P(0) refers to the initial population.
(c) The assumption made in the computation is that the population grows continuously and the rate is proportional to both the population size and the remaining capacity for growth.
To verify this assumption, we can plug in the given values and compare the result with the actual data. If the difference is within 1%, the assumption holds true.
Please provide the required values for r, P(0), and K to proceed with the calculations.
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Use the graph of y = csc x to estimate the value of csc 120°. Round to the nearest tenth.
Answer: To estimate the value of csc 120° using the graph of y = csc x, we can locate the point on the graph that corresponds to 120° and read the y-coordinate (csc value) from there.
On the graph of y = csc x, we observe that the csc value is undefined at x = 0° and x = 180° due to vertical asymptotes. Additionally, csc x has maximum and minimum points at multiples of 90°.
To estimate csc 120°, we can look for the nearest maximum or minimum point on the graph. The closest maximum point to 120° is at 90°, and the closest minimum point is at 180°.
Since the maximum value of csc x is 1, we can estimate csc 120° to be approximately 1.
Therefore, the estimated value of csc 120° is 1 (rounded to the nearest tenth).
Step-by-step explanation:
What is the probability that either event will occur?
A
2
3
B
1
P(A or B) = P(A) + P(B)
P(A or B) = [?]
Enter as a decimal rounded to the nearest hundredth.
The probability P(A or B) that either event will occur is 0.67
The probability of either event occuring ;Probability is the ratio of required outcome to the total possible outcomes . We could solve the question give. thus:
Total possible outcomes , n(Total) = 3+1+2 = 6
P(A) = n(A)/n(Total) = 3/6 = 0.5
P(B) = n(B)/n(Total) = 1/6 = 0.167
P(A or B) defined as P(A) + P(B) will become ;
P(A) + P(B) = 0.5 + 0.167 = 0.667
Hence, the probability of either A or B occuring rounded to the nearest hundredth is , P(A or B) = 0.67
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Use limits to find the area of the region between the graph of y=x³+1
and the x-axis on the interval [2, 4], or f(x³ + 1) dx
Answer:
62
Explanation:
Find the area of the region bounded the graph of y=x³+1 and the x-axis over the interval [2,4].
[tex]\text{\underline{Set up:}}\\\\\Longrightarrow \boxed{\int\limits^4_2 {x^3+1} \, dx}[/tex]
[tex]\text{Now solving...}\\\\\Longrightarrow \int\limits^4_2 {x^3+1} \, dx\\\\\Longrightarrow \frac{1}{4}x^4+x \Big]\limits^4_2\\\\\Longrightarrow [\frac{1}{4}(4)^4+(4)]-[\frac{1}{4}(2)^4+(2)]\\\\\Longrightarrow [68]-[6]\\\\\Longrightarrow \boxed{\boxed{=62}}[/tex]
Thus, the problem is solved.
find the value of x
Answer:
Option C. 5.5
Step-by-step explanation:
To solve for x in the equation:
[tex]\sf\implies\dfrac{3x - 4}{14} = \dfrac{9}{10}[/tex]
We need to isolate x on one side of the equation.
First, we simplify the left side by solving the division:
[tex]\sf\implies\dfrac{(3x - 4)}{14} = \dfrac{9}{10}[/tex]
Next, we cross-multiply to eliminate the fractions:
[tex]\sf\implies 10(3x - 4) = 14(9)[/tex]
[tex]\sf\implies 30x - 40 = 126[/tex]
Now, we isolate x by adding 40 to both sides of the equation:
[tex]\sf\implies 30x = 166[/tex]
Finally, we solve for x by dividing both sides of the equation by 30:
[tex]\sf\implies x = \dfrac{166}{30}[/tex]
[tex]\sf\implies x = 5.533[/tex]
Therefore, the value of x is approximately 5.533. Thus, the correct option is C. 5.5.
Chi-Chiribi! EmergerOrpheus at your service. Hope it helps!
The diameter of the sphere is 12.8 cm calculate the value 3.14
what is needed to be calculated please tell
pls solve these equations:
Step-by-step explanation:
First one:Calculate the difference:
12 × ( -15/12x ) = 7
Multiplying a positive and a negative equals a negative: (+) × (-) = (-)
-12 × 15/12x = 7
Cancel the greatest common factor 12
-5x = 7
Divide both sides of he equation by -5
Solution: x = -7/5
Second one:26 × (7y + 5 +3) = 1300
Divide both sides of the equation by 26
7y + 5 + 3 = 50
add the numbers
7y + 8 = 50
Move the constant to the right hand side and change it's sign.
7y = 50 - 8
Subtract the numbers
7y = 48
Divide both sides of the equation by 7
= y = 6
Third One:Convert the fraction into decimal:
37/10 ÷ (1 2/9 - 0.4)
Convert the mixed number into an improper fraction
37/10 ÷ (11/9 - 0.4)
Convert the decimal into fraction
37/10 ÷ (11/9 - 2/5)
Subtract the fractions
37/10 ÷ 37/45
To divide by a fraction, multiply by the reciprocal of that fraction.
37/ 10 × 45/37
Cancel out the greatest common factor 37
1/10 × 45
Cancel out the greatest common factor 5
1/2 × 9
Calculate the product
Solution: 9/2
Fourth One:Convert the decimal into fraction and mixed fraction into improper fraction.
1/2 + 1/18
________
(7/6 - 7/18) ÷ 14/5
Add and subtract the fractions
5/9
____
7/9 ÷ 14/5
To divide by a fraction, Multiply by the reciprocal of that fraction.
5/9
____
7/9 × 5/14
Cancel out the greatest common factor 7.
5/9
____
1/9 × 5/2
Multiply the fractions
5/9
____
5/18
Simply the complex fraction
Solution: 2
Fifth one:Multiply the brackets
0.5x - 6 + 0.2x + 1.4 = 0.3x + 3.4
Collect like terms and simplify
0.7x - 4.6 = 0.3x + 3.4
Move the variable to the left hand side and move the constant to the right hand side and change the signs.
0.7x - 0.3x = 4.6 + 3.4
Simplify
0.4x = 8
Divide both sides of the equation by 0.4
Solution: x = 20
Thank you!Hank opens a savings account with $850. The account earns 1.2% interest compounded monthly. How much will be in the account after 15 years if he makes no more deposits or withdrawals? Round your answer to the nearest cent.
After 15 years, the amount in Hank's savings account, with no additional deposits or withdrawals, will be approximately $1,044.50.
To calculate the amount in Hank's savings account after 15 years with monthly compounding interest, we can use the formula for compound interest:
A = P(1 + r/n)^(nt)
Where:
A = the future value of the account
P = the principal amount (initial deposit)
r = the annual interest rate (as a decimal)
n = the number of times the interest is compounded per year
t = the number of years
In this case:
P = $850
r = 1.2% = 0.012 (as a decimal)
n = 12 (monthly compounding)
t = 15 years
Plugging in the values into the formula, we get:
A = 850(1 + 0.012/12)^(12*15)
A = 850(1.001)^180
A ≈ 850 * 1.228824
A ≈ $1,044.50 (rounded to the nearest cent)
Therefore, after 15 years, the amount in Hank's savings account, with no additional deposits or withdrawals, will be approximately $1,044.50.
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calculate the size of angle B
Check the picture below.
HOW DO I SIMPLIFY? I WILL MARK YOU BRAINLIEST! AND EXPLAIN
Answer:
This is how you simplify it.
Answer:
Step-by-step explanation:
(3x⁵)^3
= {3x}^(15) (According to rule)
Answer = (3x)^(15)
3. MODELING REAL LIFE An apple growing on a tree
has a circumference of 6 inches. (See Example 2.)
a. The apple has a density of 0.46 gram per cubic
centimeter. Find the mass of the apple.
b. The radius of the apple increases inch per week
for the next five weeks. How does the volume
change during the five-week period? Explain
a. The mass of the apple is approximately 33.879 grams.
b. The volume of the apple increases by approximately 1.454 cubic inches during the five-week period.
a. To find the mass of the apple, we need to calculate its volume first. The circumference of the apple can be used to determine its radius.
The formula for the circumference of a circle is C = 2πr,
where C is the circumference and r is the radius.
Rearranging the formula, we have r = C / (2π).
Plugging in the given circumference of 6 inches.
we get r = 6 / (2π) ≈ 0.955 inches.
Now, we need to convert the radius from inches to centimeters since the density is given in grams per cubic centimeter.
Since 1 inch is approximately 2.54 centimeters, the radius in centimeters is [tex]0.955 \times 2.54[/tex] ≈ 2.427 cm.
Next, we can calculate the volume of the apple using the formula for the volume of a sphere: V = (4/3)πr³.
Plugging in the radius in centimeters, we get
V ≈ (4/3)π(2.427)³ ≈ 73.682 cm³.
Finally, we can find the mass of the apple by multiplying the volume by the density:
mass = volume [tex]\times[/tex] density
= 73.682 cm³ [tex]\times[/tex] 0.46 g/cm³
≈ 33.879 grams.
Therefore, the mass of the apple is approximately 33.879 grams.
b. The volume of a sphere increases with the cube of its radius.
Since the radius increases by 1/8 inch per week for five weeks, the change in radius would be[tex](1/8) \times 5 = 5/8 inch.[/tex]
Now, let's calculate the change in volume during the five-week period. The formula for the volume of a sphere is V = (4/3)πr³.
Initially, the radius was 0.955 inches.
After five weeks, the radius would be 0.955 + 5/8 inches.
To compare the change in volume, we can calculate the new volume and find the difference:
Change in Volume = New Volume - Initial Volume
Initial Volume = (4/3)π(0.955)³
New Volume = (4/3)π(0.955 + 5/8)³
By subtracting the initial volume from the new volume, we can determine how the volume changes during the five-week period.
Please note that the exact calculation will depend on the precise values used for π and the measurements provided.
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-8+5(2x+1)=-(7x+9)+x
The value of x that satisfies the equation -8 + 5(2x + 1) = -(7x + 9) + x is x = 3/4.
To solve the equation -8 + 5(2x + 1) = -(7x + 9) + x, we will simplify the expression step by step and solve for the value of x.
Distribute 5 to the terms within the parentheses: -8 + 10x + 5 = -(7x + 9) + x
Combine like terms on both sides of the equation: -8 + 5 + 10x = -7x - 9 + x
Simplifying further, we have: -3 + 10x = -6x - 9
To eliminate the negative sign on the right side of the equation, we can multiply every term by -1: -3 + 10x = -6x - 9 * -1
This simplifies to: -3 + 10x = -6x + 9
Next, we want to isolate the x terms on one side of the equation and the constant terms on the other side. We can do this by adding 6x to both sides: -3 + 10x + 6x = -6x + 9 + 6x
Simplifying further: 16x - 3 = 9
To isolate the x term, we need to eliminate the constant term on the left side. We can do this by adding 3 to both sides: 16x - 3 + 3 = 9 + 3
Simplifying further: 16x = 12
Finally, we solve for x by dividing both sides of the equation by 16: (16x)/16 = 12/16
The equation simplifies to: x = 3/4
Therefore, the value of x that satisfies the equation -8 + 5(2x + 1) = -(7x + 9) + x is x = 3/4.
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Riley put £450 into a savings account which
gathered simple interest at a rate of 2% per month.
After 6 months, Riley used some of the money in
the account to buy a bike costing £480.
How much money did Riley have left?
Answer:
£26.77
Step-by-step explanation:
450(100% + 2%)^6
= 450 (1.02)^6
= 506.77.
506.77 - 480 - 26.77.
Riley had £26.77 left.
If the average of 9 and x is equal to the average of 7, 3, and x, what is the value of x?
Hello !
(9 + x)/2 = (7 + 3 + x)/3
3(9 + x) =2(7 + 3 + x)
27 + 3x = 14 + 6 + 2x
27 + 3x = 20 + 2x
27 - 20 = 2x - 3x
7 = -x
x = -7
you can check it works for the 2 averages
slope intercept equation of (-5,-7)
Answer:
[tex]\huge\boxed{\sf y=\frac{9}{5} x + 2}[/tex]
Step-by-step explanation:
Point = (x,y) = (-5, -7)
So,
x = -5, y = -7
General form of slope-intercept equation:y = mx + bWhere m is slope and b is y-intercept.
Finding slope:Along with the already given point, let us take any other point of the line.
Point 1 = (x₁,y₁) = (-5,-7)
Point 2 = (x₂,y₂) = (0,2)
So,
x₁ = -5
y₁ = -7
x₂ = 0
y₂ = 2
[tex]\displaystyle Slope = \frac{y_2-y_1}{x_2-x_1} \\\\Slope = \frac{2-(-7)}{0-(-5)} \\\\Slope = \frac{2+7}{0+5} \\\\\boxed{Slope = \frac{9}{5} }[/tex]
Finding y-intercept:y-intercept is actually the point where x = 0.Here, x = 0 when y = 2.
So,
y-intercept = 2Put slope and y-intercept in general form of slope-intercept equation.
So,
Answer:[tex]\displaystyle y=\frac{9}{5} x + 2\\\\\rule[225]{225}{2}[/tex]
The point U is plotted on the coordinate grid below. Plot the point U', the ref
of U over the x-axis.
Click on the graph to plot a point. Click a point to delete it.
-6 -5 -4 -3 -2 -1
U
2
3
4
5
6
Answer:
The point U' is (-6, -2).
Step-by-step explanation:
The reflection of point U over the x-axis is the point U' with the same x-coordinate but a y-coordinate that is the opposite of U's y-coordinate. Since the y-coordinate of point U is 3, the y-coordinate of the reflected point U' will be -3. Therefore, the coordinates of U' are (-2, -3).
The graph should show U at the point (2, 3) and U' at the point (2, -3) after being reflected over the x-axis.
1.5 Which of the following set of numbers are integers: -25,31,-100 a) -25 c) -100 Question ? b) 31 d) All of the answers (1) [5]
Answer:
This question asks which numbers (-25, 31, -100) are integers. The answer is that all of the given numbers are integers.
Step-by-step solution:
An integer is a whole number that can be positive, negative, or zero.
The given numbers are -25, 31, and -100.
To determine whether these numbers are integers, we must check whether they are whole numbers.
Whole numbers are numbers that do not have any fractions or decimals.
-25 and -100 do not have any decimal parts, so they are whole numbers and thus integers.
31 has no decimal parts, so it is also a whole number and an integer.
Therefore, all of the given numbers (-25, 31, -100) are integers.
A correct answer is option (d), "All of the answers".
What is the meaning of "the first order predicate calculus"?
The first order predicate calculus is the mathematical logic that is used to express and analyze propositions involving objects, characteristics, and relations
What is the first order predicate calculus?A foundational framework for mathematical logic that is used to express and analyze propositions involving objects, characteristics, and relations is known as the first-order predicate calculus.
It offers a formal language for expressing statements and a set of inference guidelines for producing reliable results. By incorporating quantifiers like "for all" and "there exists," which allow statements about variables and predicates to be quantified over a domain of objects, first-order logic expands propositional logic.
It enables exact reasoning about intricate systems and structures and forms the basis for mathematical proofs, computer science, artificial intelligence, and different branches of philosophy.
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can I please get some help with this
Apologies for the confusion. The image you provided contains an expression that can be simplified as follows:
√(36 / 12) - 3 × (4 - 3)
Let's break it down step by step:
Simplify the expression inside the square root:
√(36 / 12) = √3
Simplify the multiplication:
-3 × (4 - 3) = -3 × 1 = -3
Subtract the results:
√3 - 3
Therefore, the simplified expression is √3 - 3.
<3
The least common multiple of 3, 5, 6 and 9
Step-by-step explanation:
Using prime factorization:
3 = 3 x 1
5 = 5 x1
6 = 2 x 3
9 = 3 x 3 take the bold numbers and multiply them 3 x 5 x 2 x 3 = 90
3^3-8×3? evaluate it
Answer:
3³-8*3 = 3
Step-by-step explanation:
Use order of operations:
P -> Parentheses
E -> Exponents
M -> Multiplication (left to right)
D -> Division (left to right)
A -> Addition (left to right)
S -> Subtraction (left to right)
3³=27 is done first because of the exponent. Next, we would do 8*3=24 because that has multiplication. Finally, we do 27-24=3 because of subtracting being the last step in PEMDAS.
Therefore, the final answer is 3
he quadratic functions f(x) and g(x) are described in the table:
In which direction and by how many units should f(x) be shifted to match g(x)? Left by 4 units Right by 4 units Left by 8 units Right by 8 units
In which direction and by how many units should f(x) be shifted to match g(x): A. Left by 4 units.
What is a quadratic function?In Mathematics and Geometry, the standard form of a quadratic function is represented by the following equation;
ax² + bx + c = 0
Based on the information provided about the parent quadratic function f(x), we can logically deduce that it is given by this equation;
f(x) = x²
Next, we would create a quadratic function for g(x) by using the data points provided in the table above;
g(x) = x² + 8x + 16
g(x) = x² + 4x + 4x + 16
g(x) = x(x + 4) + 4(x + 4)
g(x) = (x + 4)(x + 4)
g(x) = (x + 4)²
Therefore, the parent quadratic function must be shifted left by 4 units to create g(x).
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Write the expression for the following statement without
any spaces:
the sum of 64y and 3, cubed can be expressed as
The expression of the statement that is given above can be written as follows: 262144y³ + 27.
How to determine a way to express the given statement?To determine how to express the given statement the following should be carried out.
When a number is said to be cubed, it means that the number should be times by itself three consecutive times.
That is (64y + 3)³. This means that various components should be multiplied by itself three times. That is,
= 64×64×64(y)³ + 3×3×3
= 262144y³ + 27.
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Pls help me with this 2 questions, thanks
[Top Question] Answer: A. |-6| + |3|
Step-by-step explanation:
First, we realize they are both on the same y-axis as they both have y-values of 4. This means that we can "ignore" the y-value and focus on the x-value. To find the distance between these two points, we will find the absolute value of the x-values and add them together. This gives us answer option A;
A. |-6| + |3|
[Bottom Question] Answer: 36 [tex]\frac{3}{4}[/tex] units²
Step-by-step explanation:
To find the area of a parallelogram, we multiply the base by the height. I will change 8 [tex]\frac{3}{4}[/tex] into 8.75 and 4 [tex]\frac{1}{5}[/tex] into 4.2 to make multiplying with a calculator easier.
A = bh
A = (8.75 units)(4.2 units)
A = 36.75 units² = 36 [tex]\frac{3}{4}[/tex] units²
Anumber Y is 15 larger than A Positive number x. If their SUM is not more than 85. What are the Possible values. OF Such Number y ?
Step-by-step explanation:
y = 15 + x or x = y-15
and x sum to <= 85
x + y <= 85
(y-15) + y <= 85
2y <= 100
y <= 50 The maximum value of y is 50 minimum would be 16 ( since it must be 15 greater than a positive number x (which would be 1 ))
Use the substitution method to find the solution for the linear system.
6x + 5y = 38
4x + y = 16
Answer:
x = 3; y = 4
Step-by-step explanation:
adilenechapa22 wrote the correct answer first so they deserve the Brainiest for the question. However, I can help you understand how we get to the answer.
Step 1: Isolate y in 4x + y = 16 by subtracting 4x from both sides to prepare for the substitution:
(4x + y = 16) - 4x
y = -4x + 16
Step 2: Substitute this equation for y in the first equation to first solve for x:
6x + 5(-4x + 16) = 38
6x - 20x +80 = 38
-14x + 80 = 38
-14x = -42
x = 3
Step 3: Plug in 3 for x in 4x + y = 16 to solve for y:
4(3) + y = 16
12 + y = 16
y = 4
Optional Step 4: We can check that we've found the correct solutions by plugging in 3 for x and 4 for y in both equations in the system and seeing that we get 38 and 16:
Checking solutions in first equation:
6(3) + 5(4) = 38
18 + 20 = 38
38 = 38
Checking solutions in second equation:
4(3) + 4 = 16
12 + 4 = 16
16 = 16
Find the integrating factor and the solution of
equation:
[tex]\frac{dy}{dx}+\frac{y}{2} = 2+x[/tex]
factor: [tex]\mu(x)=e^\frac{x}{2}[/tex] solution: [tex]y(x)=2x+Ce^\frac{-x}{2}[/tex]
The solution to the given differential equation is [tex]y = 2x + Ce^{-x/2},[/tex]
where C is an arbitrary constant.
We have,
To solve the given first-order linear differential equation:
dy/dx + (1/2)y = 2 + x
We can use the integrating factor method.
The integrating factor (IF) is given by:
[tex]IF = e^{\int{(1/2)}dx}[/tex]
[tex]= e^{x/2}[/tex]
Multiplying both sides of the equation by the integrating factor:
[tex]e^{x/2} \times dy/dx + (1/2)e^{x/2} \times y = (2 + x)e^{x/2}[/tex]
The left-hand side can be simplified using the product rule of differentiation:
[tex]d/dx (e^{x/2} \times y) = (2 + x)e^{x/2}[/tex]
Integrating both sides with respect to x:
[tex]\int{d/dx} (e^{x/2} \times y) dx = \int{(2 + x)e^{x/2}} dx[/tex]
[tex]e^{x/2} \times y = \int{(2e^{x/2} + xe^{x/2}} dx\\= 2\int{e^{x/2}} dx + \int{xe^{x/2}} dx[/tex]
Using the integration rules, we find:
[tex]e^{x/2} \times y = 4e^{x/2} + 2xe^{x/2} - 4e^{x/2} + C\\= 2xe^{x/2} + C[/tex]
Dividing both sides by [tex]e^{x/2}:[/tex]
[tex]y = 2x + Ce^{-x/2}[/tex]
Therefore,
The solution to the given differential equation is [tex]y = 2x + Ce^{-x/2},[/tex]
where C is an arbitrary constant.
Learn more about integrations here:
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