Can someone PLEASE help me ASAP it’s due today!! I will give brainliest if it’s all done correctly.

Answer part A, B, and C for brainliest!!

we can multiply 6561m⁴ by 1 to get the final answer of 6561m⁴.

How to solve the problem?

In mathematics, an exponent refers to a numerical representation of repeated multiplication. An exponent is usually written as a small number that appears to the right and above a larger number, called the base. The exponent indicates how many times the base should be multiplied by itself. For example, in the expression 3², the base is 3, and the exponent is 2. This means that 3 should be multiplied by itself 2 times, resulting in 3 multiplied by 3, which equals 9.

Exponents are a shorthand way of representing repeated multiplication and can be used to simplify complicated expressions. They are widely used in algebra, calculus, and other branches of mathematics. Exponents can be positive, negative, or zero, and they can be fractions or irrational numbers. The rules of exponents, such as the product rule and power rule, allow for easy manipulation of expressions involving exponents.

To write (9m)⁴ without exponents, we need to perform the multiplication four times.

First, we can multiply 9m by 9m to get 81m².

Next, we can multiply 81m² by 9m to get 729m³.

Then, we can multiply 729m³ by 9m to get 6561m⁴.

Finally, we can multiply 6561m⁴ by 1 to get the final answer of 6561m⁴.

In summary, (9m)⁴ can be written as 6561m⁴ by performing multiplication four times using the distributive property of multiplication. It is important to note that exponents are a shorthand way of writing repeated multiplication, but the same result can always be obtained by performing the multiplication explicitly. This process may become more cumbersome for larger exponents, which is why exponents are a useful notation for expressing repeated multiplication in a more concise way.

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Answer:

1834 ÷ 334 ≈ 5.49

Since we can't make a fraction of a batch, we can make 5 batches of gumbo. therefore, the solution is

5 batches: 1834÷334

Part B:

For the smaller batches, each batch requires 334 pounds of shrimp. For the larger batches, each batch requires 614 pounds of shrimp.

subtract

614-334 = 280 pounds

divide

1834÷614 ≈ 2.99

Since we can't make a fraction of a batch, we can make 2 larger batches of gumbo.

So, the solution is: 2 fewer larger batches can be made than smaller batches.

Answer:

give up on math this just too hard

Step-by-step explanation:

no

Answer:

444 in

Hope this helps!

Step-by-step explanation:

Area of a triangle is [tex]\frac{1}{2}[/tex] × B × H

Already given, the base is 12 and the height is 12.5, [tex]\frac{1}{2}[/tex] and 12 can simplify to get 6 so 6 × 12.5 is 75. One triangle has the area of 75, the 4 triangles have a total area of 300.

The base is a square, so the formula for that is L × W, which would be 12 × 12 = 144. Add that to 300 and the surface area of the pyramid is 444.

Answer:

Annie and Javier are 10 meters apart.

Step-by-step explanation:

We can use the Pythagorean theorem to solve this problem. Let's call the distance between Annie and Javier "x". Then, we have two right triangles:

The first right triangle is formed by Mrs. Harper, Annie, and the distance between Mrs. Harper and Annie. We know that Mrs. Harper is 6 meters in front of Annie, so the hypotenuse of this triangle is 6 meters.

The second right triangle is formed by Mrs. Harper, Javier, and the distance between Mrs. Harper and Javier. We know that Mrs. Harper and Javier are 8 meters apart, so the hypotenuse of this triangle is 8 meters.

Since Mrs. Harper is the common point of both triangles, we can combine them to form a larger right triangle with sides of 6 meters, 8 meters, and x meters:

Using the Pythagorean theorem, we have:

6^2 + 8^2 = x^2

Simplifying:

36 + 64 = x^2

100 = x^2

Taking the square root of both sides:

x = 10

Therefore, Annie and Javier are 10 meters apart.

The total commission Sylvia will earn over the first three years is $1,500.

Let's assume the commission rates are X% for the first year, Y% for the second year, and Z% for the third year.

Calculate the yearly commission amounts
To calculate Sylvia's yearly commission, we'll multiply the insurance plan cost (6,000) by the respective commission rate for each year.
First-year commission = 6,000 * (X / 100)
Second-year commission = 6,000 * (Y / 100)
Third-year commission = 6,000 * (Z / 100).

Calculate the total commission over three years
To find the total commission Sylvia will earn over the first three years, we'll add the yearly commission amounts calculated.
Total commission = First-year commission + Second-year commission + Third-year commission.

To calculate the commission Sylvia will earn over the first three years, we need to use the commission rates for each year:

In the first year, Sylvia will earn a 10% commission on the $6,000 plan, which is $600.

In the second year, Sylvia will earn an 8% commission on the $6,000 plan, which is $480.

In the third year, Sylvia will earn a 7% commission on the $6,000 plan, which is $420.

Therefore, the total commission Sylvia will earn over the first three years is:

$600 + $480 + $420 = $1,500

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Question: Sylvia earns commission on insurance sales. She sold a plan that costs 6,000 per year. Based on the chart, how much commission will Sylvia earn from this sale over the first three years?

Commission Schedule.

Year         Rate

1 st                10

2 nd              8%

3 rd               7%

The common ratio of the second geometric progression is 1/5.

A geometric progression or a geometric sequence is the sequence, in which each term is varied by another by a common ratio. The next term of the sequence is produced when we multiply a constant (which is non-zero) to the preceding term. It is represented by:

a, ar, ar2, ar3, ar4, and so on.

Let the common ratio of the second geometric progression be r. Then the sum to infinity of the first progression is:

S1 = a1/(1 - r1), where a1 = 25 and r1 = 1/2

And the sum to infinity of the second progression is:

S2 = a2/(1 - r), where a2 = 40 and r is the common ratio of the second progression

We know that S1 = S2, so we can set the two expressions equal to each other:

S1 = S2

a1/(1 - r1) = a2/(1 - r)

Substituting the given values:

25/(1 - 1/2) = 40/(1 - r)

Simplifying:

50 = 40/(1 - r)

Multiplying both sides by (1 - r):

50 - 50r = 40

Subtracting 50 from both sides:

-50r = -10

Dividing both sides by -50:

r = 1/5

Therefore, the common ratio of the second geometric progression is 1/5.

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Part A:The volume of cat food in the can is approximately 9.62 cubic inches.

Part B:The ratio of cubic inches to ounces is approximately 1.66:1.

Volume is a measure of the amount of space occupied by an object or a substance. It is the quantity of three-dimensional space enclosed by a closed surface or bounded by a given set of points. Volume is typically measured in cubic units, such as cubic meters (m³) or cubic centimeters (cm³).

PART A:

The volume of a cylinder can be calculated using the formula V = πr²h, where V is the volume, r is the radius, and h is the height. Since the diameter of the can is 3.5 inches, the radius is half of that, or 1.75 inches. The height of the can is 1 inch.

Plugging these values into the formula, we get:

V = π(1.75)²(1)

V ≈ 9.62 cubic inches

Therefore, the volume of cat food in the can is approximately 9.62 cubic inches.

PART B:

To write a ratio of cubic inches to ounces, we need to divide the volume of the can (in cubic inches) by the weight of the cat food (in ounces):

Ratio = Volume of cat food in can (cubic inches) / Weight of cat food (ounces)

Ratio = 9.62 cubic inches / 5.8 ounces

Ratio ≈ 1.66 cubic inches per ounce

Therefore, the ratio of cubic inches to ounces is approximately 1.66:1.

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The surface area of the square or other shaped barn will be in unit ft² i.e. D.

What are squares?

In mathematics, a square is a geometric shape that has four equal sides and four right angles. It is also known as a regular quadrilateral or a square polygon. The sides of a square are also called edges or vertices. The area of a square is given by the formula A = s², where s is the length of one of its sides.

Now,

Let the barn to be a square or any type of shape.

The farmer can expect to calculate the surface area of the barn in square units, such as square meters or square feet. This means that the correct option is d) ft².

Surface area is the measure of the total area that the surface of an object occupies. It is measured in square units because it involves calculating the area of multiple faces or surfaces of an object. In the case of the barn, the farmer will need to measure the area of each face of the barn that will be painted, such as the walls and roof, and add them together to get the total surface area. This calculation will give the farmer the total area of the barn that needs to be painted and the amount of paint needed to cover the area.

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We can estimate that about 74 people voted in the election, which is the same as the actual number of voters.

What are the voters?

To estimate the number of people who voted in the election, we can use the proportion of registered voters who actually voted.

If we know that there are 8,246 registered voters in the town of Mayfield and 74 voters cast their vote, we can calculate the proportion of registered voters who voted as follows:

Proportion of voters = Number of voters / Number of registered voters

Proportion of voters = 74 / 8,246

Proportion of voters = 0.00897

We can then use this proportion to estimate the number of people who voted by multiplying it by the total number of registered voters:

Estimated number of voters = Proportion of voters x Number of registered voters

Estimated number of voters = 0.00897 x 8,246

Estimated number of voters = 73.9 (rounded to the nearest whole number)

Therefore, we can estimate that about 74 people voted in the election, which is the same as the actual number of voters.

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Complete question is: There are 8,246 registered to vote in the town of mayfield, about 74 people voted in the election, which is the same as the actual number of voters.

Answer:

We can use the formula for the average (arithmetic mean) of a set of numbers to solve this problem:

Let's call the missing number x. Then the sum of the numbers in the list is:

We want the average of this list to be 12, so we can set up the following equation:

Multiplying both sides by 6, we get:

Subtracting 52 from both sides, we get:

Therefore, the missing number is 20, and the complete list is:

The average of this list is:

Answer:

No, drawing four aces from a deck of cards does not have the same probability as drawing four 3s.

Step-by-step explanation:

To see why, consider the number of ways to draw four aces from a deck of cards. There are only four aces in the deck, so the first card drawn must be an ace, which has a probability of 4/52 (or 1/13). After the first ace is drawn, there are only three aces left in the deck, so the probability of drawing a second ace is 3/51. Similarly, the probability of drawing a third ace is 2/50, and the probability of drawing the fourth ace is 1/49.

Therefore, the probability of drawing four aces from a deck of cards is:

(4/52) x (3/51) x (2/50) x (1/49) = 0.0000185

On the other hand, there are four 3s in the deck, so the first card drawn must be a 3, which has a probability of 4/52 (or 1/13). After the first 3 is drawn, there are only three 3s left in the deck, so the probability of drawing a second 3 is 3/51. Similarly, the probability of drawing a third 3 is 2/50, and the probability of drawing the fourth 3 is 1/49.

Therefore, the probability of drawing four 3s from a deck of cards is:

(4/52) x (3/51) x (2/50) x (1/49) = 0.0000185

The probabilities are the same for drawing four aces and drawing four 3s because the same process is followed for each scenario: a specific card is drawn, the number of remaining cards decreases by one, and the probability of drawing the next card changes accordingly.

In summary, the probability of drawing four aces from a deck of cards is the same as the probability of drawing four 3s, but they are both very low probabilities because they require drawing specific cards in a specific order from a large deck of cards.

3. The measure of angle S in the given pentagon is 155.33 degrees. 4. The value of x is 9. 5. The value of x is 40 degrees. 6. The value of angle C is 33 degrees. 7. The polygon has 30 sides.

A polygon having 5 sides and 5 angles is called a pentagon. Two terms, Penta and Gonia, both of which denote five angles, combine to form the word "pentagon." End to end, the sides of a pentagon come together to form a shape. Every side of a regular pentagon has the same length, and its five angles are all the same size. A pentagon is said to as irregular if its side length and angle measurement are not equal.

The sum of angles of a pentagon is equal to 540 degrees.

Thus,

5x + 2 + 10x - 3 + 8x - 19 + 13x - 31 + 7x - 11 = 540

42x - 62 = 540

42x = 602

x = 14.33

The angle of s is:

13(x) - 31 = 13(14.33) - 31 = 155.33

Hence, the measure of angle S in the given pentagon is 155.33 degrees.

4. In a regular hexagon, each angle is equal, and the sum of all the angles is equal to 720 degrees.

6A = 720

A = 120

11x + 21 = 120

x = 9

5. The angle of a nonagon is 140 degrees.

Now, 140 + x = 180

x = 80 degrees.

6. For the given triangle we have:

exterior angle of C = D + E

Substituting the value of D and E as:

7x - 2 = 180 - 9x + 31 + 180 - 4x + 33

7x - 2 = 360 - 13x + 64

20x = 426

x = 21.3

Angle C = 180- (7(21.3) - 2) =  33 degrees.

7. single angle = (n-2) x 180 / n

168n = (n - 2) 180

168n = 180n - 360

360 = 12n

n = 30

The polygon has 30 sides.

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Answer:

The answer to your problem is, There are total 55 counters out of which 11 are green and 44 are other color.

Step-by-step explanation:

This is a ratio and proportion question. There are c amount of counters in the box

same ratio as in the box

Green : total

4:         20

11:          x

Use cross product rule

x * 4= 20 *11

x= 20*11/4

x= 55. Which is the answer.

So there are total 55 counters out of which 11 are green and 44 are other color. Benedict take 20 counters out of which 4 are green. 

Thus the answer to your problem is, There are total 55 counters out of which 11 are green and 44 are other color.

The probability that the proportion of persons more than 6 feet tall will differ from the population proportion by more than 5%  is approximately 0.0456.

The standard error of the sample proportion is:

SE = √[(p × (1 - p)) / n]

where p is the population proportion, and n is the sample size.

Substituting the given values, we get:

SE = √[(0.56 × 0.44) / 643] ≈ 0.025

To find the probability that the sample proportion differs from the population proportion by more than 5%, we need to find the z-scores for the upper and lower bounds of the interval:

Lower bound: 0.56 - 0.05 = 0.51

Upper bound: 0.56 + 0.05 = 0.61

z_lower = (0.51 - 0.56) / 0.025 ≈ -2.00

z_upper = (0.61 - 0.56) / 0.025 ≈ 2.00

Using a standard normal distribution table or calculator, we can find the probabilities for these z-scores:

P(Z < -2.00) ≈ 0.0228

P(Z > 2.00) ≈ 0.0228

The probability that the sample proportion differs from the population proportion by more than 5% is the sum of these two probabilities:

P(|p - 0.56| > 0.05) = P(Z < -2.00) + P(Z > 2.00) ≈ 0.0456

Therefore, the probability that the proportion of persons more than 6 feet tall in a random sample of size 643 will differ from the population proportion by more than 5% is approximately 0.0456, rounded to four decimal places.

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Answer:

There are multiple statements that can be made about the function y = x^2 - 6x + 8. Here are a few examples: 1. The function is a quadratic function, meaning it is a polynomial of degree 2. 2. The coefficient of the x^2 term is positive, which means the function opens upwards and has a minimum value. 3. The function intersects the y-axis at y = 8. 4. To find the x-coordinate of the vertex of the parabola, we can use the formula x = -b/(2a), where a is the coefficient of the x^2 term and b is the coefficient of the x term. In this case, a = 1 and b = -6, so x = 3. This means the vertex is at the point (3, 1). 5. The function can be factored

In exponential function , after 7 moths approximate user is 45542.

What is exponential function?

A mathematical function called an exponential function is employed frequently in everyday life. It is mostly used to compute investments, model populations, determine exponential decline or exponential growth, and so forth.

Here Number of current used = 37,030.

A new social media site is increasing its user base by approximately 3% per month then after 7 month,

Using exponential growth formula then,

=> f(x)=a([tex]1+r)^x[/tex]

=> 37030(1+3%[tex])^7[/tex]

=> 37030[tex](1+\frac{3}{100})^7[/tex]

=> 37030[tex](1+0.03)^7[/tex]

=> 37030[tex](1.03)^7[/tex]

=> 45542

Hence in 7 moths approximate user is 45542.

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If you paid $16 in sales tax on a new phone. The phone costs $320. the percent of sales tax is 5%.

To find the percent of sales tax, we need to divide the amount of sales tax by the cost of the phone, and then multiply by 100 to convert to a percentage:

Percent of sales tax = (Sales tax / Cost of phone) x 100%

Percent of sales tax = (16 / 320) x 100%

Simplifying the expression inside the parentheses:

Percent of sales tax = 0.05 x 100%

Multiplying:

Percent of sales tax = 5%

Therefore, the percent of sales tax is 5%.

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We can follow these steps using the points provided in the table and for Terrance to determine which diver ascended at a faster rate and by how much.

To determine which diver ascended at a faster rate, we need to calculate the slope of the line for each diver's ascent. The slope represents the rate of change in depth over time.

A steeper slope indicates a faster ascent.
Step 1: Find the slope of Bailey's ascent using the points given in the table.

we can use the slope formula:

(y2 - y1) / (x2 - x1).
Step 2: Find the slope of Terrance's ascent using the two points given for Terrance.
Step 3: Compare the slopes of both divers.

The diver with the steeper slope (greater slope value) ascended at a faster rate.
Step 4: To determine how much faster the faster diver ascended, subtract the smaller slope value from the larger slope value.
Without the actual data points, I cannot provide specific calculations.

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Part A : From Angle Angle similarity, ΔMBR and ΔZLP are similar.

Part B.: As the ratios of sides are not equal, triangles are not similar.

Congruent triangles and similar triangles are two different  but closely related concepts. Similar triangles are any two or more triangles having the identical proportions of their corresponding sides, an equal pair of corresponding angles, and their similar shape.

Part A:

using the equal sides property of triangle:

In ΔRBM,

side BM  = side RM

So,

angle B = angle R    (eq 1)

In triangle ZLP and  PL =  LZ

So, angle P = angle Z        (eq 2)

And angle B  =  angle P

∠B = ∠R = ∠P = ∠Z

By Angle Angle similarity, triangle RBM and triangle ZLP are similar.

Part 16.:

In right angle triangle:  KLN.

(KL)² = LN² + KN²

(KL)² = 8² + 15²

(KL)² = 64 + 225

(KL)² = 289

(KL) = 17

taking the ratios of sides:

27/8 = 30.6/17

3.375 ≠ 1.8

As the ratios of sides are not equal, triangles are not similar.

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Answer:

y= 2 (x - -5/2)^2-39/2 ?

The error the student made was not correctly distributing the -3 to the second term (1/3y) inside the parenthesis in Step 1. The student incorrectly wrote -3(1/3y) as -3y instead of -y.

By correctly distributing the -3, the proper simplification would lead to the final answer of y = -12x.

The error the student made in simplifying the equation occurred in Step 1.

To solve the equation 9x = -3(x + 1/3y) for y is as follows:
Step 1: Distribute the -3 to both terms inside the parenthesis:
9x = -3x - y
Step 2: Add 3x to both sides of the equation to isolate the term with y:
9x + 3x = -y
Step 3: Simplify the equation by combining like terms:
12x = -y
Step 4: To solve for y, multiply both sides of the equation by -1:
y = -12x.

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The expression equivalent to 4(15 - 7) is 32.

What is an expression?

An expression is a combination of values, variables, operators, and function calls that are evaluated to produce a result. An expression can be as simple as a single value or as complex as a multi-level nested set of calculations.

We can simplify the expression 4(15 - 7) by performing the operation inside the parentheses first (since parentheses take precedence over multiplication). We get:

15 - 7 = 8

Substituting this value back into the expression, we get:

4(8)

Multiplying 4 by 8, we get:

32

Therefore, the expression equivalent to 4(15 - 7) is 32.

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Complete question is: The expression equivalent to 4(15 - 7) is 32.

The probability that the Yankees will lose when they score less than 5 runs is 0.805.

What exactly is probability?

Probability is a measure of the possibility of an event to be occurred. It is a numerical value between 0 and 1, with 0 indicating that the event is impossible, and 1 indicating that the event is certain.

Now,

Let's denote the event "Yankees win a game" by W, and the event "Yankees score 5 or more runs in a game" by S. Then, we are given:

P(W) = 0.51

P(S) = 0.59

P(W' and S') = 0.33, where W' denotes the complement of the event W (i.e., Yankees lose a game), and S' denotes the complement of the event S (i.e., Yankees score fewer than 5 runs).

We can use the following formula to find the probability that the Yankees lose when they score fewer than 5 runs:

P(W' | S') = P(W' and S') / P(S')

Using the given values, we have:

P(W' | S') = 0.33 / (1 - 0.59)

= 0.33 / 0.41

≈ 0.805

Rounding to the nearest thousandth, we get:

P(W' | S') ≈ 0.805

Therefore, the probability that the Yankees will lose when they score fewer than 5 runs is approximately 0.805.

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The parallelogram therefore has a 3/4 square inch area.

A parallelogram is a geometric figure with four equal sides that are parallel to one another. It has equal opposed angles and two sets of parallel sides.

The base length and height of a parallelogram must be multiplied to determine its area. In this instance, the parallelogram's shorter side is specified as 1 inch and its longer side as 4 inches. It states that the height is 3/4 inch.

Hence, the parallelogram's area is:

Area = base x height

= 1 inch x 3/4 inch

= 3/4 square inches

3/4 square inches is equal to 1 inch by 3/4 inch by the base and height.

The parallelogram therefore has a 3/4 square inch area.

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Answer:I only know that number 4 is yards i hope that is enough for now

Step-by-step explanation: in a game of soccer there are numbers that represent yards or any sport.

Step-by-step explanation:

a) The appropriate unit of measurement for the surface area of a tissue box could be square inches or square centimeters.

b) The appropriate unit of measurement for the amount of space in a gift box of earrings could be cubic inches or cubic centimeters.

c) The appropriate unit of measurement for the area of a parking lot could be square meters, square feet, depending on the size of the parking lot.

d) The appropriate unit of measurement for the length of a soccer field could be meters, yards or feet.

e) The appropriate unit of measurement for the volume of a medium-sized fish tank could be liters or cubic feet.

Option D : The statement that is true about the quadratic function f(x)=-x²+8x-7, which states that the zeros are 1 and 7, because f(x) = -(x - 1)(x - 7).

To find the zeros of the quadratic function f(x) = [tex]-x^2 + 8x - 7[/tex], we need to set f(x) equal to zero and solve for x:

[tex]-x^2 + 8x - 7 = 0[/tex]

We can solve this quadratic equation using the quadratic formula or by factoring. Let's use factoring.

We can rewrite the quadratic expression as:

[tex]-(x^2 - 8x + 7)[/tex]

To factor the expression, we need to find two numbers whose product is 7 and whose sum is -8. These numbers are -1 and -7. Therefore, we can rewrite the expression as:

-(x - 1)(x - 7)

So the zeros of the function are x = 1 and x = 7.

Therefore, the statement that is true is option D: The zeros are 1 and 7, because f(x) = -(x - 1)(x - 7).

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Which statement about f(x)=-x²+8x-7 is true?

A. The zeros are 1 and -7, because f(x)=-(x-1)(x+7)

B. The zeros are -1 and -7, because f(x)=-(x+1)(x+7)

C. The zeros are -1 and 7, because f(x)=-(x+1)(x-7)

D. The zeros are 1 and 7, because f(x)=-(x-1)(x-7)

Here is your answer hope this helps:

m=8

8x8=64

64+9= 73

Value of variable x in the given triangle is 10 units.

Triangle proportionality refers to the relationship between the sides of two similar triangles. Similar triangles are those that have the same shape but may differ in size.

In similar triangles, the corresponding sides are in proportion, which means that the ratio of the lengths of any two corresponding sides is equal to the ratio of the lengths of any other pair of corresponding sides.

In the given figure;

Two lines of the triangle are parallel

By triangle proportionality rule,

AB/AC=AD/AE

7.6/11.6=19/19+x

7.6(19+x)=19×11.6

x=29-19

x=10

hence, value of variable x in the given triangle is 10 units.

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