5.34x10⁵ is c) 10,000,000 times a) greater than 5.34x10⁻⁻², with the comparison made by analyzing the exponents in scientific notation.
The relationship between 5.34x10⁵ and 5.34x10⁻² can be understood by comparing their magnitudes in scientific notation. Scientific notation allows us to easily see how many times larger or smaller one number is compared to another by comparing the exponents of ten.
When comparing 5.34x10⁵ to 5.34x10⁻², we must look at the difference in exponents. The exponent of the first number is 5, while the exponent of the second number is -2. To calculate how many times greater the first number is than the second, we subtract the smaller exponent from the larger one: 5 - (-2) = 5 + 2 = 7. Therefore, the difference in exponents is 7, which means 5.34x10⁵ is 10⁷ times larger than 5.34x10⁻².
The value of 10⁷ is 10,000,000. Thus, we can say that 5.34x10⁵ is 10,000,000 times greater than 5.34x10⁻².
Tracie rides the bus home from school each day. The graph represents her distance from home relative to the number of minutes since the bus left the school.
What does the slope of the graph mean?
Tracie’s bus travels towards her home at an average speed of mile per minute.
Tracie’s bus travels towards her home at an average speed of 2 miles per minute.
Tracie’s bus travels away from her home at an average speed of mile per minute.
Tracie’s bus travels away from her home at an average speed of 2 miles per minute.
Answer:
Tracie’s bus travels towards her home at an average speed of 1/2 mile per minute.
Step-by-step explanation:
The labels on the graph tell us that the independent variable, x, represents time in minutes, and the dependent variable, y, represents distance from home in miles.
Looking at the graph, we can see that the number of miles from home decreases by 1 for every two minutes. Since the distance is decreasing, this means that the bus is getting closer to home. Since it decreases by 1 mile every 2 minutes, this means that the speed is 1/2 mile per minute.
The answer is : A, Tracie's bus travels towards her home at an average speed of 1/2 mile per minute.
can someone please help me with this plss and thanks
4x + 32 - 4 = 34 - 2x
4x + 28 = 34 - 2x
4x = 34 - 2x - 28
4x = -2x + 6
4x + 2x = 6
6x = 6
x = 1
which unit is most appropriate to use to measure the volume of a bathtub
The most appropriate unit to measure the volume of a bathtub is liters.
When considering the volume of a bathtub, the most appropriate unit of measure would be liters. Milliliters are too small for such a large volume, and while gallons could be used, liters are more standard for this type of measurement in many parts of the world, including in scientific contexts.
For example, if we have a common bathtub that is 13.44 dm long, 5.920 dm wide, and 2.54 dm deep, we would calculate its volume in liters. Since a bathtub has a capacity similar to a large container, liters are an appropriate choice because they give a manageable number for the volume. In measuring smaller volumes, like that of a water balloon or a chemical solution in a lab, milliliters or a graduated cylinder may be used instead.
An isosceles triangle has an angle that measures 80°. Which other angles could be in that isosceles triangle? Choose all that apply
In an isosceles triangle with an angle measuring 80°, the other two angles could be 50° each.
An isosceles triangle has two sides of equal length and two angles of equal measure. Since one angle measures 80°, the other two angles must be equal to each other. To find the measure of these angles, we subtract 80° from 180° (the sum of all angles in a triangle) and divide the result by 2. So, each of the other two angles in the isosceles triangle could be 50°.
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The other angles that could be in the isosceles triangle are:[tex]\[\boxed{50^\circ \text{ and } 20^\circ}\][/tex]
In an isosceles triangle, two sides are of equal length, and the angles opposite those sides are equal. The sum of the angles in any triangle is always [tex]\(180^\circ\).[/tex] Given that one angle measures [tex]\(80^\circ\)[/tex], we need to determine the possible configurations for the remaining angles.
Case 1: 80° is the vertex angle
If the [tex]\(80^\circ\)[/tex] angle is the vertex angle (the angle between the two equal sides), the remaining two angles must be equal. Let x be the measure of each of the remaining angles.
Since the sum of the angles in a triangle is [tex]\(180^\circ\):[/tex]
[tex]\[80^\circ + x + x = 180^\circ\]\[80^\circ + 2x = 180^\circ\][/tex]
[tex]\[2x = 100^\circ\][/tex]
[tex]\[x = 50^\circ\][/tex]
So, the other angles in this case are [tex]\(50^\circ\)[/tex] each.
Case 2: 80° is one of the base angles
If the [tex]\(80^\circ\)[/tex] angle is one of the base angles (the angles opposite the equal sides), there will be two such angles. Let y be the measure of the vertex angle.
Since the sum of the angles in a triangle is [tex]\(180^\circ\):[/tex]
[tex]\[80^\circ + 80^\circ + y = 180^\circ\]\[160^\circ + y = 180^\circ\][/tex]
[tex]\[y = 20^\circ\][/tex]
So, the other angles in this case are [tex]\(80^\circ\) and \(20^\circ\).[/tex]
Possible angles
Given that one angle is [tex]\(80^\circ\),[/tex] the possible configurations for the angles in the isosceles triangle are:
- [tex]\(80^\circ, 50^\circ, 50^\circ\)[/tex]
- [tex]\(80^\circ, 80^\circ, 20^\circ\)[/tex]
So, the other angles that could be in the isosceles triangle are:
[tex]\[\boxed{50^\circ \text{ and } 20^\circ}\][/tex]
These are the angles that apply based on the given conditions.
the sum of twice a number and 5 is at most 3 less than the number
2x + 5 ≤ x - 3
We can treat this like a usual algebraic equation.
Subtract x from both sides.
x + 5 ≤ -3
Subtract 5 from both sides.
x ≤ -8
Thus, x is less than or equal to the quantity -8.
We can test this by plugging in two values into the original inequality: a number greater than -8, and a number less than -8.
2x + 5 ≤ x - 3
We'll use 2 first.
2 * 2 + 5 ≤ 2 - 3
9 ≤ -1 × this is incorrect
Now we'll use -10
2x + 5 ≤ x - 3
2 * -10 + 5 ≤ -10 - 3
-15 ≤ -13 √ this is correct
Mathematics defines an algebraic equation as a statement in which a relationship between two expressions is established through an equals sign.
For the given question the equation will be:
[tex]\rm 2x + 5 = x - 3[/tex]
On solving the above equation, x can be defined as -8.
Solution of Algebraic Equation.Let the number be x.
According to the question:
Twice of x + 5 = x - 3
This forms a quadratic equation:
[tex]\rm 2x + 5 = x - 3[/tex]
The equation [tex]\rm 2x + 5 = x + 3[/tex] can be solved as follows:
[tex]\begin{aligned} \rm 2x + 5 &= x - 3\\\\ 2x - x &= -3 - 5\\\\x &= -8 \end[/tex]
Therefore the number is -8.
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You have invested in three different stocks: Engineering Aces, Upton Clothiers, and Thompson Musical Instruments. Because you have diversified your stocks so well, the way they change is independent. The probabilities of the stocks changing in value by more than 10% in a given week are listed below.
P(E) = 19%
P(U) = 11%
P(T) = 6%
What is the probability that all three will change by more than 10% in the same week?
Answer:
answer is 0.001254.
Step-by-step explanation:
Given that you invested in 3 stocks of Engineering Aces, Upton Clothiers, and Thompson Musical Instruments.
Also given that each stock value is independent of the other.
Let E be the event changing in value by more than 10% in a given week for Engineering Aces,
U be the event changing in value by more than 10% in a given week for Upton Clothiers, and T be the event changing in value by more than 10% in a given week for Thompson Musical Instruments.
Given that P(E) = = 19%
P(U) = 11%
P(T) = 6%
probability that all three will change by more than 10% in the same week
= P(EUT)
= P(E) P(U) P(T) since three events are independent.
=0.19(0.11)0.06
= 0.001254
Final answer:
The probability that all three stocks, Engineering Aces, Upton Clothiers, and Thompson Musical Instruments, will change by more than 10% in the same week is calculated by multiplying their individual probabilities together, resulting in a probability of 0.1254%.
Explanation:
The question asks for the probability that all three stocks will change by more than 10% in the same week, given their individual probabilities.
To find this probability, since the changes in stocks are independent of each other, we multiply the probabilities of each event occurring together. The formula for the joint probability of independent events is P(E and U and T) = P(E) × P(U) × P(T).
Using the given probabilities:
P(E) = 19% or 0.19P(U) = 11% or 0.11P(T) = 6% or 0.06We calculate:
P(E and U and T) = 0.19 × 0.11 × 0.06
Which equals:
P(E and U and T) = 0.001254 or 0.1254%
Therefore, the probability that all three stocks will change by more than 10% in the same week is 0.1254%.
What is 5103 to the nearest thousands
5,103 rounded to the nearest thousands is 5,000
In order to round a number to the nearest thousand, we must see if the digit in the hundreds position is greater or less than 5.
In this case, 1 is less than 5
If the number is less than five, we round the number down, and in this case, to the nearest thousand.
Therefore, the nearest thousand would be 5000
a restaurant owner bought 6 boxes of disposable cups for $81 with each box containing 3741 cups if he wanted to divvy up the Cups among his 3 restaurants with with each restaurant getting the same number of cups how many cups of each do I get
A math club is researching a golf tournament fund-raiser. It will cost $1,000 to host the tournament. If it rains, the club will lose the investment. If it is sunny, it is expected that the club will collect $4,500 from the participants. If the chance of rain is 20%, what is the expected value for the tournament?
A.) –$800
B.)–$200
C.)$2600
D.)$3400
your answer would b c or $2600
The expected value for this tournament is given as C. $2600
How to solve for the expected value for the tournamentThe cost of hosting = 1000
The amount to be gotten if sunny = 4500
The chance that it would rain = 20 percent
4500 - 1000 = 3500
Chance of rain-1000 * 20%
= -200
3500 * (1-20%) = 2800
2800 - 200
= 2600
Hence the expected value that has been solved for the tournament is $2600
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Wouldn't let me type the question so I just attached an image.
What is the domain of this function? A. {3, 9, 12} B. {-2, 2, 3, 4} C. {-2, 2, 3, 4, 9, 12} D. {3}
B. {-2, 2, 3, 4}
usually in a graph like this, the domain (x) is on the left side, and the range (y) is on the right side.
hope this helps! ❤ from peachimin
10 points for answer 11!!11!!
that is the 2nd one Gomez to Chang
For this one, it is important to know that when it says "under par" think of that as a negative number. When doing that, here are the choices:
Jones= +3
Chang: -5
Gomez: -2
Harrison: -4
In golf, the lowest score wins, so put the numbers in numerical order from lowest to highest. Here the answer:
-5, -4, -2, +3
Now match the scores with the corresponding person:
Chang, Harrison, Gomez, and Jones
So A is your answer.
Hope this helps!
6y-5x=5 and x=2y+7 using substition in linear functions
6y-5x=5 x=2y+7
x=2y+7 x=2(-10)+7
6y-5(2y+7)=5 x= -20+7
6y-10y-35=5 x= -13
6y-10y=5+35
-4y=40
y= -40/4
y=-10
Final answer:
To solve the given system using substitution, express x from the second equation and substitute into the first, then solve for y. After finding y, substitute it back into the second equation to find x, resulting in x = -13 and y = -10.
Explanation:
Solving Linear Equations Using Substitution Method
To solve the system of linear equations 6y - 5x = 5 and x = 2y + 7 using the substitution method, we first take the second equation, which gives us an expression for x, and substitute it into the first equation.
Step 1: Write the second equation x = 2y + 7.
Step 2: Substitute x in the first equation: 6y - 5(2y + 7) = 5.
Step 3: Expand and simplify: 6y - 10y - 35 = 5 ⇒ -4y = 40 ⇒ y = -10.
Step 4: Now that we have y, we substitute it back into the second equation to find x: x = 2(-10) + 7 ⇒ x = -20 + 7 ⇒ x = -13.
Therefore, the solution to the system of equations is x = -13 and y = -10.
An elevator started on the first floor and went up 18 floors. It then comes down 11 floors and went back up 16 floos. At what floor did this stop.
A line has a slope of -1/2 and a y-intercept of –2. So what is the x intercept on the line.
A. -4
B. -1
C. 1
D. 4
Answer:
(4,0)
Step-by-step explanation:
The equation of the line is y = (-1/2)x - 2. At the x-intercept, y = 0. Setting y = (-1/2)x - 2 to zero, we get (1/2)x = 2, and thus x = 4.
I NEED HELP WITH #36
Answer:
2 3/4 in
Step-by-step explanation:
The sum of the marked distances is equal to the total distances shown:
... (1 5/8) + ? + (1 5/8) = 6
... ? = 6 - (1 5/8 + 1 5/8) . . . . . subtract the constants on the left
... ? = 6 - (2 5/4) . . . . . . . . . . . add the numbers in parentheses
... ? = 6 - 3 1/4 . . . . . . . . . . . . rewrite the number in parentheses (2+5/4 = 2 + 1 1/4)
... ? = (6 -3) -1/4 = 3 -1/4 . . . . . see below
... ? = 2 3/4
_____
Comment on subtacting mixed numbers
Some folks find it convenient to subtract by adding. To find the difference between 3 1/4 and 6, they would start by adding 3/4 to make 4, then add 2 to make 6. Then they see the difference is 3/4 + 2 = 2 3/4.
Here, I chose to subtract 3 1/4 by subtracting 3, then subtracting 1/4. After subtracting 3 from 6, I get 3, from which I now need to subtract 1/4. It should be clear that taking 1/4 away from 3 will leave 2 3/4. (One of the units has been converted to 4/4 to make the subtraction of 1/4 possible.)
_____
Comment on doubling a fraction
As part of this problem, we needed to add 1 5/8 to itself. We did that by doubling the integer part, and doubling the fraction. When a fraction has an even denominator, it is easy to double it: replace the denominator with half its value — 2×(5/8) = 5/4, where the denominator 4 is half the denominator 8.
Is .634 an integer ??
No.
An integer is a whole number.
In the case of .634 (or 0.634), we see that it is not a whole number, as there is a decimal point, and numbers to the right of the decimal points.
hope this helps
No, because .634 is an odd number and odd numbers cannot be integers.
David plants a tree that is 3 feet tall. at the end of the 4 years it has grown to be 6 feet tall, and then stops growing. after 7 years, david cuts down the tree to put in a pool. what is the domain, in years, of the function that represents the height of the tree?
The domain of the function is (0, 7) years.
The function that represents the height of the tree is defined over the period during which the tree's height changes. Given that,
The tree starts growing at 0 years (the time when it is first planted). It grows for 4 years, reaching a height of 6 feet by the end of that period. After 4 years, the tree stops growing and remains at 6 feet for the remaining 3 years. After 7 years total (4 years of growth + 3 years of constant height), the tree is cut down.
The domain of the function that represents the height of the tree is the time interval from when the tree is planted until it is cut down.
clara wants to run a total od 5 1/2 miles each lap around the track is 0.25 miles how many laps around the track does clara need to run to complete 5 1/2
Final answer:
Clara needs to run 22 laps around the track, at 0.25 miles per lap, to reach her goal of 5 1/2 miles.
Explanation:
The question is about calculating the number of laps Clara needs to run to cover a distance of 5 1/2 miles, with each lap being 0.25 miles long. To find the number of laps, we divide the total distance she wants to run by the distance of one lap.
Total distance Clara wants to run: 5 1/2 miles or 5.5 miles (converting 1/2 into decimal for easier calculation).
Distance of one lap around the track: 0.25 miles.
To find the number of laps, we perform the division:
5.5 miles ÷ 0.25 miles/lap = 22 laps.
Therefore, Clara needs to run 22 laps around the track to complete her goal of 5 1/2 miles.
what is the square root of 28
The decimal form would be 5.29150262
what is the solution to {2x +3y=11 and 3x+3y=18
Answer:
The ordered pair that satisfies the equation is (7, -1)
Step-by-step explanation:
In order to find this, we can solve by subtracting. Start by stacking the two equations on top of one another and subtracting like terms.
3x + 3y = 18
(-) 2x + 3y = 11
--------------------
x = 7
Now that we have the value for x, we can plug in to either equation to find y.
2x + 3y = 11
2(7) + 3y = 11
14 + 3y = 11
3y = -3
y = -1
Final answer:
By applying the method of subtraction to eliminate one variable, we find that the solution to the system of equations 2x + 3y = 11 and 3x + 3y = 18 is x = 7 and y = -3.
Explanation:
Solving a System of Linear Equations
The two linear equations given are:
2x + 3y = 113x + 3y = 18To find the solution, we can follow a method similar to the one described for solving simultaneous linear equations. We can subtract the first equation from the second to eliminate the variable y:
3x + 3y = 18-(2x + 3y = 11)This gives us x = 7. Now we can substitute x back into either equation to get the value of y:
2(7) + 3y = 11
By solving this, we get y = -3.
The solution to the system of equations is x = 7 and y = -3.
30 tens = ones
30 tens = hundreds
30 tens = 30 x 10 = 300
300 ones = 300 x 1 = 300
300 is your answer
30 tens = 30 x 10 = 300
3 hundreds = 3 x 100 = 300
3 is your answer
~Rise Above the Ordinary
Which graph represents the inequality? 2x + y < 4
Mrs. Escalante was riding a bicycle on a bike path. After riding 2/3 of a mile, she discovered that she still needed to travel 3/4 of a mile to reach the end of the path. how long is the bike path.
The answer to your question is...
1 5/12 or 17/12The length of the bike path is 1 5/12 miles.
Explanation:To find the length of the bike path, we need to determine the total distance Mrs. Escalante travels. She rode 2/3 of a mile and then discovered she still needed to travel 3/4 of a mile. This means she has already traveled a total of 2/3 + 3/4 = 17/12 miles. Let's convert this to a mixed number: 1 5/12 miles. Therefore, the length of the bike path is 1 5/12 miles.
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Multiply.
1.25(−3.6)
Enter your answer as a decimal in the box.
Answer:
-4.5
Step-by-step explanation:
the multiplication of 1.25(−3.6) is -4.5.
What are mathematics operations?
• A mathematical operation is a function that converts a set of zero or more input values (also called "b" or "arguments") into a defined output value. The number of operands determines the operation's arity. Most commonly studied operations are binary operations (i.e., operations of arity 2), such as addition and multiplication, and unary operations (i.e., operations of arity 1), such as additive and multiplicative inverses.
• Zero-arity operations, or nullary operations, are constants, and mixed products are arity three operations, or ternary operations.
Here, the given expression is :
1.25(−3.6)
Now after removing the bracket multiplication sign will apply :
1.25 x −3.6 = -4.5
Therefore, the multiplication of 1.25(−3.6) is -4.5.
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How many inches are in 5 1/2
There are 12 inches in every foot 5 x 12 is 60 half a foot would be 12÷2=6 so 60+ 6=66 inches
Write an inequality that represents the fact that while making your product
you can’t exceed this spending limit. Im making beads for 25 cents and selling them for 1$ my spending limit is 40$
Answer:
[tex]x \leq 40 / 0.25\\ x \leq 160\\[/tex]
Step-by-step explanation:
If the spending limit is $ 40 and making each beads costs $ 0.25, then the amount of accounts you must do multiplied by the manufacturing cost should not exceed $ 40.
Then the inequation that this restriction would represent is:
[tex]0.25x\leq 40\\[/tex]
Where x is the number of beads made.
This could also be written more specifically:
[tex]x \leq 40 / 0.25\\ x \leq 160\\[/tex]
Therefore the number of beads must be less than or equal to 160
zoe watched 6 episodes of her favorite online video series in 1.5 hours. she spent the same amount of time watching each episode. what is the unit rate of hours to episodes
What can you say about the marked angles in these parallelogram?
A Opposite angles of a parallelogram are congruent. ( the same measure)
B Consecutive angles of a parallelogram are supplementary (measure add to 180)
C consecutive angles of a parallelogram are congruent. (The same measure)
D Opposite angles of a parallelogram are supplementary (measure add to 180)
Please need help on this don’t understand this one
Answer: A and B both are correct statements.
Step-by-step explanation:
Let ABCD is a parallelogram then its properties are as follows:-
1. Opposite angles and sides of parallelogram are always congruent.
i.e.AB=CD and AD=BC and ∠A=∠C and ∠B=∠D
2.Consecutive angles are supplementary.
i.e. ∠A+∠B=180° and ∠B+∠C=180°
3. Its diagonals bisect each other.
4. The sum of all the angles is 360°.
Can anyone help me? I need an exact answer, please no guesses. Thanks in advance
The first step is to figure out what angle DEB is equal to. Check out the attached image. I've marked this as angle y and it is shown in purple.
Note how the purple angle y and the orange 160 degree angle form a straight angle (180 degrees). So the two angles add to 180. Let's solve for y
(orange angle) + (purple angle) = straight angle
(angle CEB) + (angle DEB) = angle CED
y+160 = 180
y+160-160 = 180-160 ... subtract 160 from both sides
y = 20
----------------------------------
Now we can use this to figure out angle x. The three angles x, 115, and 20, combine to 180 degrees as they all glue together to form a straight angle. Let's solve for x:
x+115+y = 180
x+115+20 = 180 ...replace y with 20
x+135 = 180 ......... combine like terms
x+135-135 = 180-135 ...... subtract 135 from both sides
x = 45
Therefore, the final answer is 45