The answer is 5(2y-3).
Factorization is an easy process wherein you just need to find out the common factors and solve your question as per requirement.
To factor 10y-15, we need to find the greatest common factor (GCF) of the two terms. The greatest common factor (GFC) of 10 and 15 is 5. We can then factor out the GCF from each term to get:
10y-15 = 5(2y-3)
where 5 is a whole number greater than 1.
So the answer as a product with a whole number greater than 1 is 5(2y-3).
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Kind of confused on this one.
Consider two dice-throwing experiments. Find the probabilities
of the following events.
Let X = sum of the two dice:
P (X = 5)
P( 2 ≤ X ≤ 6)
P(X = 5 or X = 10
So the probabilities of the given events are:
P(X = 5) = 1/9
P(2 ≤ X ≤ 6) = 5/12
P(X = 5 or X = 10) = 7/36
To find the probabilities of the given events, we need to consider all the possible outcomes of the two dice-throwing experiments and the number of favorable outcomes for each event.
There are 6 possible outcomes for each die, so the total number of possible outcomes for the two dice is 6 × 6 = 36.
For the event X = 5, the favorable outcomes are (1, 4), (2, 3), (3, 2), and (4, 1). So the probability of this event is P(X = 5) = 4/36 = 1/9.
For the event 2 ≤ X ≤ 6, the favorable outcomes are (1, 1), (1, 2), (1, 3), (1, 4), (1, 5), (2, 1), (2, 2), (2, 3), (2, 4), (3, 1), (3, 2), (3, 3), (4, 1), (4, 2), and (5, 1). So the probability of this event is P(2 ≤ X ≤ 6) = 15/36 = 5/12.
For the event X = 5 or X = 10, the favorable outcomes are (1, 4), (2, 3), (3, 2), (4, 1), (4, 6), (5, 5), and (6, 4). So the probability of this event is P(X = 5 or X = 10) = 7/36.
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the coordinates of the vertices of △RST are R(−3, −1) , S(−1, −1) , and T(−4, −5) . The coordinates of the vertices of △R′S′T′ are R′(3, −3) , S′(3, −1) , and T′(−1, −4) . What is the sequence of transformations that maps △RST to △R′S′T′?
The sequence of transformations that maps △RST to △R′S′T′ is a translation of 6 units to the right and 2 units down, followed by a reflection across the y-axis, and finally a rotation of 90 degrees counterclockwise about the origin.
What is the sequence of transformation?
In mathematics, a sequence of transformations refers to a series of geometric transformations performed on a shape to create a new shape. These transformations can include translations, rotations, reflections, and dilations.
The sequence of transformations is the order in which the transformations are performed. The order matters because different sequences of transformations can lead to different final shapes.
For example, to transform a triangle into a new position, we might first perform a translation to move the triangle to a new location, then perform a rotation to change its orientation, and finally perform a reflection to flip the triangle across a line. The sequence of transformations in this case is translation-rotation-reflection.
Sequences of transformations are used in geometry to analyze and describe shapes and to solve problems related to symmetry, congruence, and similarity. They are also used in computer graphics and animation to create 2D and 3D shapes that can be moved and transformed on a screen.
To map △RST to △R′S′T′, we need to perform a sequence of transformations that includes translations, rotations, reflections, and/or dilations. Here's one possible sequence of transformations:
Translation: We can translate △RST by 6 units to the right and 2 units down to get a new triangle that has R at (3, -3), S at (5, -3), and T at (2, -7).
Reflection: We can reflect the translated triangle across the y-axis to get a new triangle that has R′ at (-3, -3), S′ at (-5, -3), and T′ at (-2, -7).
Rotation: We can rotate the reflected triangle 90 degrees counterclockwise about the origin to get a new triangle that has R′ at (3, -3), S′ at (3, -1), and T′ at (-1, -4).
Therefore, the sequence of transformations that maps △RST to △R′S′T′ is a translation of 6 units to the right and 2 units down, followed by a reflection across the y-axis, and finally a rotation of 90 degrees counterclockwise about the origin.
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btract polynomials Subtract the polynomials. ((3)/(2)c^(2)-(4)/(3)c+9)-((1)/(6)c^(2)+(1)/(9)c+2)
Subtracting the polynomial (1/6)c² + (1/9)c + 2 from (3/2)c² - (4/3)c + 9 will result to the polynomial (4/3)c² + (-13/9)c + 7.
To subtract the polynomials, we need to subtract the corresponding terms. That is, we subtract the coefficients of the c² terms, the coefficients of the c terms, and the constant terms. The result will be a new polynomial. Here is the solution:
((3)/(2)c² - (4)/(3)c + 9) - ((1)/(6)c² + (1)/(9)c + 2)
= (3/2)c² - (4/3)c + 9 - (1/6)c² - (1/9)c - 2
= (3/2 - 1/6)c² + (-4/3 - 1/9)c + (9 - 2)
= (8/6)c² + (-13/9)c + 7
= (4/3)c² + (-13/9)c + 7
So the answer is (4/3)c² + (-13/9)c + 7.
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A certain rectangular tarp covers 200 square meters. Its width is 5
meters. How long is the tarp?
The length of the tarp with an area of 200 square meters is 40 meters.
What is the length of the tarp?The area of a rectangle is expressed as;
Area = length × width
Given that;
Area = 200 square metersWidth = 5metersLength = ?When a rectangular tarp has an area of 200 square meters and a width of 5 meters, we can use the above formula to find the length of the tarp.
Plug these values into the formula and solve for the length:
Area = length × width
200 = Length x 5
To solve for Length, we need to isolate it on one side of the equation. We can do this by dividing both sides of the equation by 5:
200/5 = Length
This simplifies to:
40 = L
L = 40
Therefore, the rectangular tarp is 5 meters wide and 40 meters long.
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Pls help really struggling with this:)
Answer:
5x^2+2x-7
Step-by-step explanation:
First find the common variable.
6x^2 + 10x -7 and -x^2 -8x
Add those together like any other problem.
[tex](6x^2 + 10x -7) + (-x^2 -8x)\\\\6x^2+10x-7 -x^2-8x\\\\(6x^2-x^2) + (10x-8x) - 7\\\\5x^2+2x-7[/tex]
List Price Trade Discount Rate Net Price Factor Single Equivalent Discount Trade Discount Net Price $7,800. 00 15/4/4
If the discount net price is $7,800 and Net Price Factor, trade discount are to be calculated, then trade discount is equal to $1,170 and Net Price Factor is equal to 0.9216.
The formula used for Trade Discount is given as product of List Price and Trade Discount Rate. The value of list price is given as $7,800.00 and that of Trade Discount Rate is 0.15. Putting the given values in the formula, we get the following result:
Trade Discount = $7,800.00 x 0.15 = $1,170.00
Cash Discount 2 = 4% of (Net Price - Cash Discount 1)
∵ Net Price Factor = (100% - 4%) x (100% - 4%) / 100%
⇒ Net Price Factor = 0.9216
Single Equivalent Discount = (1 - Net Price Factor) x 100%
∴ Single Equivalent Discount = (1 - .9216) x 100%
Single Equivalent Discount = 7.84%.
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Refer to complete question below:
Complete the following table by finding the net price factor, single equivalent discount, trade discount (in dollars), and net price in dollars). Round the net price factor and single equivalent discount to five decimal places, and the trade discount and net price to the nearest cent, when necessary. List Price Trade Discount Rate Net Price Factor Single Equivalent Discount Trade Discount Net Price $7,800.00 15/4/4
Solve the following inequality for x. 10x>=-20 Enter your answer as an inequality.
We have to, the solution to the inequality is x >= -2
How to solve the inequality?
To solve the inequality 10x >= -20, we need to isolate the variable x on one side of the inequality sign. We can do this by dividing both sides of the inequality by 10. This gives us:
10x/10 >= -20/10
Simplifying the fractions gives us:
x >= -2
Therefore, the solution to the inequality is x >= -2. This means that any value of x that is greater than or equal to -2 will satisfy the inequality.
Answer: x >= -2
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Determine at what value (s) of m will the given quadratic equation have a repeated solution. 3x^(2)+4mx+m=0
The values of m that will result in a repeated solution for 3x^(2)+4mx+m=0 are m = 0 and m = 3/4.
The given quadratic equation is 3x^(2)+4mx+m=0. In order to find the value(s) of m that will result in a repeated solution, we need to use the discriminant of the quadratic formula.
The discriminant of the quadratic formula is given by b^(2)-4ac, where a, b, and c are the coefficients of the quadratic equation.
In the given equation, a = 3, b = 4m, and c = m.
Plugging these values into the discriminant, we get:
(4m)^(2)-4(3)(m) = 16m^(2)-12m = 0
A repeated solution occurs when the discriminant is equal to 0. So, we need to solve the equation 16m^(2)-12m = 0 for m.
Factoring out a common factor of 4m, we get:
4m(4m-3) = 0
This gives us two possible values for m:
4m = 0 or 4m-3 = 0
Solving for m, we get:
m = 0 or m = 3/4
Therefore, the values of m that will result in a repeated solution for the given quadratic equation are m = 0 and m = 3/4.
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determine the base of a parallelogram with height 6
feet and area 15 square feet.
To determine the base of a parallelogram, we can use the formula for the area of a parallelogram, which is A = b*h, where A is the area, b is the base, and h is the height.
We are given the height (h) and the area (A), so we can rearrange the formula to solve for the base (b):
b = A/h
Substituting the given values for A and h:
b = 15/6
Simplifying:
b = 2.5
Therefore, the base of the parallelogram is 2.5 feet.
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Using numbers 0-6 and not repeating them.
? divided by ??
= ?? divided by ??
Please help Me and my friend cannot solve this one
2 divided by 4 and 3 divided by 6 where these number can be any numbers that have the same ratio as 1:2 and under 0-6 and not repeating them.
Define numbers?A number is a fundamental building block of mathematics. For a range of tasks, including measuring, counting, and indexing, numbers are utilised. There are different types of numbers depending on their characteristics, such as natural numbers, whole numbers, rational and irrational numbers, integers, real numbers, complex numbers, even and odd numbers, etc. The basic integer arithmetic operations can be used to calculate the outcome number.
In the given question, we need to find two sets of three distinct numbers between 0 and 6 that have the same ratio.
One possible solution is:
2 divided by 4.
= 3 divided by 6
Here:
The ratio of the first set is 2:4 or 1:2. When we divide 2 by 4, we get 0.5.
The ratio of the second set is 3:6 or 1:2. When we divide 3 by 6, we also get 0.5.
Therefore, we have:
2 divided by 4.
= 0.5
3 divided by 6.
= 0.5
So, we can say:
2 divided by 4
= __ divided by __
where 3 and 6 can be any numbers that have the same ratio as 1:2.Similarly,
3 divided by 6
= __ divided by __
where 3 and 6 can be any numbers that have the same ratio as 1:2.
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Find the value of x.
AB is parallel to CD.
Answer:
27+X=42
X=15
Step-by-step explanation:
interior opposite angle are equal.
The population of a city was approximately 450,000 in the year 2000 and was projected to grow at
an annual rate of 2.3%. Predict the population for the year 2006.
Answer: 515,783
Step-by-step explanation: f(x)= a(1+r)^x 450,000(1+0.023)^6
Can you put this into intercept form
Answer:
whats the equation
Step-by-step explanation:
What is the rule to find the missing term ? ( IMAGE HAS TABLE )
CHOICES
A. 2/n
B. n + 2
C. 2n
D. n - 2
~ PLEASE HELP ~
WILL GIVE BRAINLIEST
Answer:
Step-by-step explanation: g
The function V(t) - 3400t+ 18000, where V is value and t is time in years, can be used to find the value of a large copy machine during the first 5 years of use. a. What is the value of the copier after 3 years and 9 months? After 3 years and 9 months, the copier is worth $ ___
b. What is the salvage value of the copier if it is replaced after 5 years? After 5 years, the salvage value of the copier is $ ___
c. State the domain of this function. ___ <= t <= ___
d. Sketch the graph of this function.
After 3 years and 9 months, the copier is worth $30,750. After 5 years, the salvage value of the copier is $35,000. The domain of the function is 0 <= t <= 5.
a. To find the value of the copier after 3 years and 9 months, we need to plug in the value of t into the function V(t). Since 3 years and 9 months is equivalent to 3.75 years, we plug in 3.75 for t:
V(3.75) = 3400(3.75) + 18000
V(3.75) = 12750 + 18000
V(3.75) = 30750
Therefore, the copier is worth $30,750 after 3 years and 9 months.
b. To find the salvage value of the copier after 5 years, we need to plug in 5 for t into the function V(t):
V(5) = 3400(5) + 18000
V(5) = 17000 + 18000
V(5) = 35000
Therefore, after 5 years, the salvage value of the copier is $35,000.
c. The domain of this function is the set of all possible values of t. Since the function is defined for the first 5 years of use, the domain is 0 <= t <= 5.
d. To sketch the graph of this function, we can plot a few points and connect them with a line. For example, we can plot the points (0, 18000), (1, 21400), (2, 24800), (3, 28200), (4, 31600), and (5, 35000). The graph will be a straight line with a positive slope, starting at (0, 18000) and ending at (5, 35000).
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Find the degree of monomial -7q2r3s6
The degree of the monomial -7q² + r³ + s⁶ is 11.
What is an Algebraic Expression?An algebraic expression is a combination of variables, constants, and mathematical operations such as addition, subtraction, multiplication, and division. It represents a mathematical phrase or sentence and can be simplified or evaluated by substituting numerical values for variables.
The degree of a monomial is the sum of the exponents of its variables.
In the given monomial, -7q² + r³ + s⁶, the variables are q, r, and s, and their exponents are 2, 3, and 6, respectively.
So, the degree of the monomial is the sum of these exponents:
degree = 2 + 3 + 6 = 11
Therefore, the degree of the monomial -7q² + r³ + s⁶ is 11.
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which expression would be easier to simplify if you used the commutative property to make simplifying -1/3-10+7+2/3+5 easier?
A.(-1/3+2/3)+{5+7+(-10)}
B.{-1/3+(-10)}+{7+2/3+5
C.{-1/3+7+(-10)}+(5+2/3)
D.{5+(-1/3)+(-10)}+(2/3+7)
Option D, {5+(-1/3)+(-10)}+(2/3+7), would be easier to simplify if we use the commutative property.
What is the commutative property, and how can it be used to simplify expressions?
The commutative property is a property of addition and multiplication that allows us to change the order of the numbers being added or multiplied without changing the result.
That is, [tex]a + b = b + a[/tex] and [tex]a \times b = b \times a[/tex].
To simplify expressions, we can use the commutative property to rearrange the order of the terms in a way that makes the arithmetic easier to perform.
Find the expression:
We are given the expression -1/3-10+7+2/3+5, and we want to know which option would be easier to simplify using the commutative property.
Option D, {5+(-1/3)+(-10)}+(2/3+7), would be easier to simplify using the commutative property because we can group the terms that have like terms together. Specifically, we can group the negative terms together and the positive terms together:
{5+(-1/3)+(-10)}+(2/3+7) = {(5)+[(-1/3)+(-10)]}+{(2/3)+7}
Now we can simplify each group separately. For the first group, we can add the terms inside the brackets using the commutative property:
{-1/3+(-10)} = -10 - 1/3 = -31/3
For the second group, we can add the terms directly:
{2/3+7} = 2/3 + 21/3 = 23/3
Substituting these results back into the original expression, we get:
-1/3-10+7+2/3+5 = -31/3 + 23/3 + 5
Now we can add the terms directly to get:
-31/3 + 23/3 + 5 = -8/3 + 5 = 7/3
Therefore, the expression simplifies to 7/3.
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Please Solve it for me. I am confused.
The tangent trigonometry ratio can be used to determine the measure of m∠F using the length shown. Option C is correct
Solving trigonometry identityThe given figure is a right triangle.
According to the question, we are to determine the trigonometry ratio that can be used to find m∠F.
Given the following sides
Hypotenuse = EF
Opposite to m∠F = DE
Adjacent = DF
Since tan m∠;F = opposite/adjacent = DE/DF
tan m∠F can be used to determine m∠F.
The same goes with tan and sine since we can determine the value of the hypotenuse but only tangent can be used to find the measure given the length shown.
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(5x^4-4x^3-2x^2+x-19)-(x^4+5x^3+8x^2+x+5)
simplify
Answer:
To simplify the expression, we need to distribute the negative sign to all the terms inside the parentheses, and then combine like terms.
Starting with:
(5x^4-4x^3-2x^2+x-19)-(x^4+5x^3+8x^2+x+5)
Distribute the negative sign inside the parentheses:
5x^4 - 4x^3 - 2x^2 + x - 19 - x^4 - 5x^3 - 8x^2 - x - 5
Now we can combine like terms:
(5x^4 - x^4) + (-4x^3 - 5x^3) + (-2x^2 - 8x^2) + (x - x) + (-19 - 5)
Simplifying further:
4x^4 - 9x^3 - 10x^2 - 24
Therefore, the simplified expression is:
4x^4 - 9x^3 - 10x^2 - 24.
5. A right triangle has side lengths of
8 inches and 6 inches. What is the
length of the hypotenuse, in inches?
Answer:10
Step-by-step explanation:
A^2 + B^2 = C^2
8^2 + 6^2 = 100^2
take the square root since c is squared
sqrt 100 = 10
Answer:
Step-by-step explanation:
10
What is the maximum of the sinusoidal function?
Enter your answer in the box.
The maximum of the sinusoidal function is 4
How to determine the maximum of the functionFrom the question, we have the following parameters that can be used in our computation:
The graph of the sinusoidal function
In the graph of the sinusoidal function, we can see that
The maximum is at y = 4
Also, we can see that
The minimum is at y = 1
Hence, the maximum is 4
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y = -6x - 8
What is the slope in the equation?
What is the y-intercept in the equation?
By answering the supplied question, we may infer that the response is slope As a result, the equation's y-intercept is equal to -8.
what is slope?A line's slope determines how steep it is. The gradient is mathematically expressed as gradient overflow. By dividing the vertical change (run) between two spots by the height change (rise) between the same two locations, the slope is determined. The equation for a straight line, y = mx + b, is written as a curve form of an expression. When the slope is m, b is b, and the line's y-intercept is located (0, b). For instance, the y-intercept and slope of the equation y = 3x - 7 (0, 7). The location of the y-intercept is where the slope of the path is m, b is b, and (0, b).
The slope of the line is represented by the coefficient of x in the equation Y = -6x - 8.
As a result, the equation's slope is -6.
-8, the line's y-intercept, serves as the equation's constant term.
As a result, the equation's y-intercept is equal to -8.
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What value of x will show that line j is parallel to line k?
The value of x is 23°
What is Line?A line is a straight, one-dimensional figure that extends infinitely in both directions. It is often represented graphically as a straight line on a coordinate plane, with an equation that describes its position.
A line can be defined by any two points on it, and every point on the line can be expressed as a linear combination of those two points.
Line j and k are parallel and another line crossing it means transversal line, then the corresponding angles are equal which is,
(5x+9)° = (4x+32)°
5x-4x = 32-9
x = 23°
Therefore, the value of x is 23°
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A machine in a factory cuts out triangular sheets of metal. Which of the triangles are right triangles? Select all that apply
The triangles which are right triangles as required to be determined in the task content are; Choice A; Triangle 1 and Choice D; Triangle 4.
Which among the given triangles are right triangles?Recall; the Pythagorean theorem only holds for right triangles.
Therefore, for a triangle to be a right triangle; the square of its longest side must be equal to the sum of squares of its two other sides.
Therefore;
Triangle 1 is a right triangle because; (√106)² = 9² + 5²; 106 = 106.
Triangle 2 is not a right triangle because; (√39)² ≠ 2² + 6²; 39 ≠ 40.
Triangle 3 is not a right triangle because; (√179)² ≠ 6² + 12²; 179 ≠ 180.
Triangle 4 is a right triangle because; (√73)² = 3² + 8²; 73 = 73.
Ultimately, the correct choices are; Choices A ana D.
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Car
Cabana
4
Rotter
Coaster
-4-20
2 Beach
2-
y
-4
2 4
Water
Slide
X₁
1 mile
1. What is the perimeter, in miles, of the
rectangle formed by connecting the
points representing the cabana, beach,
water slide, and roller coaster?
A 10 miles
© 20 miles
B 11 miles
D 22 miles
2. What is the total distance in miles
from the car to the cabana and then
from the cabana to the beach?
A 10 miles
©20 miles
B 11 miles
D 22 miles
The perimeter, in miles, of the rectangle formed by connecting the points representing the cabana, beach, water slide, and roller coaster will be 22 miles.
What is Perimeter?The perimeter of a form is the space surrounding its edge. Find the perimeter of various forms by summing the lengths of their sides.
Given, a coordinate system where 1 unit = 1 mile
Lets,
First, calculate the linear distance between adjacent points as displayed in the graph.
Distance between car to cabana = 4 units = 4 miles
Distance between cabana to beach = 6 units = 6 miles
Distance between beach to water slide = 5 units = 5 miles
Distance between water slide to roller coaster = 6 units = 6 miles
Distance between roller coaster to cabana =5 units = 5 miles
Thus,
1) the perimeter, in miles, of the rectangle formed by connecting the points representing the cabana, beach, water slide, and roller coaster:
Perimeter = 6 + 5 + 6 + 5
Perimeter = 22 miles
2) the total distance in miles from the car to the cabana and then from the cabana to the beach:
Distance = 4 + 6
Distance = 10 miles
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Exercise V (4×5=20 points )
True or False? Explain clearly. 1. Every matrix with ones down the main diagonal is invertible. 2. Let A,B,M be square matrices of the same size. If B=M−1AM, then detB=detA. 3. Suppose that a matrix A satisfies the equation A2=A. Then det A=0. 4. If A and B are invertible n×n matrices, then A is invertible and the inverse of AB is B−1A−1
The inverse of AB is B−1A−1
1. True. Every square matrix with ones down the main diagonal has an inverse, since the diagonal elements are all non-zero.
2. False. Generally, the determinant of B does not necessarily equal the determinant of A, even when B is a product of A and other matrices.
3. True. If a matrix A satisfies the equation A2=A, then its determinant is 0, since A=A2 implies detA=det(A2)=detA×detA=detA2=0.
4. True. If A and B are both invertible n×n matrices, then AB is also invertible, and the inverse of AB is B−1A−1.
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11=5+a
a+4=b+3
Use both equations to work out the value for b
b=7
------------------
Suppose that y varies directly at the cube root of x and that y = 100 when x = 6859. What is y when x =1331? round your two decimo necessary Answer y = ____?
When x = 1331, the value of y is 55.72. So, the answer is y = 55.72.
According to the given information, y varies directly at the cube root of x. This means that we can write the equation as y = k * (x)^(1/3), where k is a constant. We can find the value of k by plugging in the given values of y and x. So,100 = k * (6859)^(1/3) => k = 100 / (6859)^(1/3)Now, we can plug in the value of x = 1331 and k into the equation to find the value of y.y = 100 / (6859)^(1/3) * (1331)^(1/3) => y = 100 * (1331/6859)^(1/3) => y = 55.72 when x = 1331, the value of y is 55.72. So, the answer is y = 55.72.
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What is the solution to this equation?
9 ^x- 1 = 2
O A. 1
O B. 2
O C.
1/2
OD. -1/2