Answer:
Flip a fair coin. It has a 50% chance of landing heads up and a 50% chance of landing tails up. Therefore, the person who will do the dishes will be chosen at random.
Answer:
B: Put each person's name on a separate piece of paper in a bag. Randomly draw a name. The person whose name is chosen does the dishes.
D: Roll a number cube. If the number rolled is even, Alexa does the dishes. If the number is odd, Bart does the dishes.
Step-by-step explanation:
I got it right:)
The first number in a sequence is 8. If each number in the sequence is 10 less than three times the previous number, then what will the fourth term be?
The fourth term of the arithmetic series is 38.
Given that, the first number in arithmetic series (a)=8 and common difference (d) =10.
What is the nth term of the arithmetic series?The nth term of the arithmetic series is [tex]a_{n} =a+(n-1) \times d[/tex].
Now, the fourth term= [tex]a_{4} =8+(4-1) \times 10[/tex]
=8+30=38
Therefore, the fourth term of the arithmetic series is 38.
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6 = 3x - 9
x + 4 < 1
x/2 + 3 = -5
Answer:
see explanation
Step-by-step explanation:
1
6 = 3x - 9 ( add 9 to both sides )
15 = 3x ( divide both sides by 3 )
5 = x
2
x + 4 < 1 ( subtract 4 from both sides )
x < - 3
3
[tex]\frac{x}{2}[/tex] + 3 = - 5
Multiply terms on both sides by 2
x + 6 = - 10 ( subtract 6 from both sides )
x = - 16
Which statement is NOT true about the slope of a straight-line graph?
A) Slope is a measure of the steepness of the line
B) Slope is the ratio of vertical change to horizontal change
C) Slope is zero if the line is horizontal
D) Slope is 1 if the line is vertical
Answer:
Option D. Slope is 1 if the line is vertical
Step-by-step explanation:
we have
Part A) Slope is a measure of the steepness of the line
The statement is true
Because, the steepness of a line is measured by the absolute value of the slope.
Part B) Slope is the ratio of vertical change to horizontal change
The statement is true
Because the formula to calculate the slope between two points is equal to
[tex]m=\frac{y2-y1}{x2-x1}[/tex]
so
Is the ratio of vertical change to horizontal change
Part C) Slope is zero if the line is horizontal
The statement is true
Because If the line is horizontal, the y-coordinate of two points is the same
therefore
The vertical change is equal to zero
Part D) Slope is 1 if the line is vertical
The statement is Not true
Because, if the line is vertical the slope is undefined
Answer:
Slope is 1
1
if the line is vertical.
Step-by-step explanation:
Caleb took his sled to the top of the hill. The snow was pure and white. He jumped on the sled and whizzed down the hill. He was so excited. Winter was his favorite season. He went down the hill three times. Each time he traveled ninety feet. How far did he travel on his sled?
Help summer Homework
NEED HELP ASAP (RADICALS)
Order from least to greatest:
[tex]\sqrt{9}[/tex]
-6[tex]\sqrt{5}[/tex]
5[tex]\sqrt{3}[/tex]
-5[tex]\sqrt{6}[/tex]
What is the y-intercept of the function,represented by the table of values below?
Answer:
8
Step-by-step explanation:
So the y-intercept is not given by your table because there is no x that is listed as 0.
But don't fret; we can still find it.
Let's see if the function is linear by seeing if we have the same slope per two points in the table.
For the first pair ( the points (-2,16) and (1,4) ), x increased by 3 and the y decreased by 12 so the slope there is -12/3=-4.
Now looking at the next pair ( the points (1,4) and (2,0) ), x increased by 1 while y decreased by 4 so the slope is -4/1=-4.
So the function appears to be linear.
So the slope-intercept form of a line is y=mx+b where m is slope and b is y-intercept.
We already found the slope from earlier which is m=-4.
So the equation so far is y=-4x+b.
Now to find b, the y-intercept, we need to use a point (x,y) on the line along with y=-4x+b.
Let's see my favorite on the list of points is (2,0).
y=-4x+b with (x,y)=(2,0)
0=-4(2)+b
0=-8+b
8=b
So the y-intercept is 8.
Which pair of points will determine a line
parallel to the x-axis?
(1) (2,3), (2,-5)
(2) (5, 4), (-1, 4)
(3) (2, 2), (-1, -1)
(4) (3, 4), (6,2)
Please help I don’t get it I’m stuck:(
Answer:
2) (5,4) and (-1,4)
These have the same y so this line will be horizontal making it parallel to the x-axis.
Step-by-step explanation:
All horizontal lines are parallel to each other. The x-axis is horizontal. So we are looking for a horizontal line. On a horizontal line, all the y-coordinates are the same; their equation is in the form y=a number after all.
Anyways we looking for a pair of points with the same y-coordinate.
1) (2,3) and (2,-5)
These have the same x-coordinate so this line is vertical. This would actually be perpendicular to the line given.
2) (5,4) and (-1,4)
These have the same y so this line will be horizontal making it parallel to the x-axis.
3) (2,2) and (-1,-1)
y's aren't the same so not horizontal
x's aren't the same so not vertical
4) (3,4) and (6,2)
y's aren't the same so not horizontal
x's aren't the same so not vertical
For a pair of points to be parallel to the x-axis, the points have to consist the same x-coordinates.
In this case, only (1) (2,3), (2,-5) have the same x-coordinates.
Therefore, the answer is (1) (2,3), (2,-5).
Hope it helps!
According to the rational root theorem what are all the potential rational roots of f(x)=9x^4-2x^2-3x+4
Answer:
+/- 1, [tex]\frac{+-1}{+-3},\frac{+-1}{+-9},+-2,\frac{+-2}{+-3},\frac{+-2}{+-9},+-4,\frac{+-4}{+-3}, \frac{+-4}{+-9}[/tex] ....
Step-by-step explanation:
The Rational root theorem states that If f(x) is a Polynomial with integer coefficients and if there exist a rational root of the form p/q then p is the factor of the constant term of the function and q is the factor of the leading coefficient of the function
Given: f(x)= 9x^4-2x^2-3x+4
Factors of q (leading coefficient) are: +/-9, +/-3, +/-1
Factors of p (constant term) are: +/-4 , +/-2, +/- 1
According to the theorem we write the roots in p/q form:
Therefore,
p/q =+/- 1, [tex]\frac{+-1}{+-3},\frac{+-1}{+-9},+-2,\frac{+-2}{+-3},\frac{+-2}{+-9},+-4,\frac{+-4}{+-3}, \frac{+-4}{+-9}[/tex] ....
Find the tan θ when sin θ= -cos θ and θ is in quadrant IV
Answer:
Step-by-step explanation:
sin θ= - cos θ
if : cos θ ≠ 0
you have : tan θ = -1
tan θ = - tan π/4
tan θ = tan(- π/4 )
θ = - π/4 +kπ k ∈ Z
calculate: k when θ is in quadrant IV : 3π /2 ≤ θ ≤2π
3π /2 ≤ - π/4 +kπ ≤2π
add π/4: 3π /2 + π/4 ≤ - π/4 +kπ+π/4 ≤2π +π/4
7π/4 ≤ kπ ≤9π/4
7/4 ≤ k ≤9/4
1.75 ≤ k ≤ 2.25
k ∈ Z : k =2
so : θ = - π/4 +2π
θ = 7π/4
θ = 7(180°)/4 = 315°
Cecilia correctly solved this inequality.
3x > 102
X> 34
Which graph matches the inequality?
28 29 30 31 32 33 34 35 36 37 38 39 40
28 29 30 31 32 33 34 35 36 37 38 39 40
The graph of the inequality x > 34 is graphed
What is an inequality?An inequality is an expression that shows the non equal comparison of two or more numbers and variables.
Given the inequality:
3x > 102
Divide the inequality by 3:
x > 34
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What is the value of b in the equation below?
5^6/5^2=a^b
3
4
5
8
Answer:
b=4
Step-by-step explanation:
subtract the exponents
6-2=4
The value of b is 4.
What is exponent ?Exponent is a mathematical method to express large numbers in power form. It will describe how many times a number multiplied by itself.
Example : 7⁵ , where the number 7 multiplied 5 times by itself.
What is the required value of b ?Given, 5⁶/5² = 5ᵇ
We know that, in exponent, if [tex]a^{m}=a^{n}[/tex], then m=n
Here, 5⁶/5² = 5ᵇ
⇒ [tex]5^{6-2} =5^{b}[/tex]
⇒ [tex]5^{4} =5^{b}[/tex]
∴ By the above rule, b = 4
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The Outlanders Club keeps track of the mean and median ages of its members. The ages of the six members are 26, 18, 42, 22, 38,
and 34. Which will increase more, the mean or the median, when a new member who is 65 years old joins?
What is the volume of the composite figure?
12in
4 in
3 in.
7 in.
Answer:
Step-by-step explanation:
[tex]V_p = b \cdot h \cdot w[/tex], where b, h, w are base, height and width respectively.
[tex]V_{sp} = \frac{1}{3} \cdot {A_b} \cdot h[/tex], where h is the height, and A_b is the area of the base.
First let's calculate the volume of the paralelipiped by the first formula.
[tex]V_p = 7 \cdot 4 \cdot 3 = 84 in^2[/tex]
Then let's find out the height of the pyramid, which is 12 - 4 = 8 in.(See drawing)
Then the area of the base of the square pyramid is simply.
[tex]A_r = 3 \cdot 7 = 21 in^2[/tex]
Now we can find the volume of the pyramid.
[tex]V_{sp} = \frac{1}{3} \cdot 21 \cdot 8 = 56 in^3[/tex]
To find the total volume, let's add both volumes.
[tex]V_T = 84 + 56 = 140 in^3[/tex]
The volume of the composite figure is calculated by adding the volume of the individual shapes that make up the figure. For a figure composed of a rectangular prism and a triangular prism, you would calculate both volumes separately and add them together, giving a total volume of 186 in³ based on the dimensions provided.
Explanation:In mathematics, the term volume refers to the amount of space occupied by a 3-dimensional object.
The composite figure you've given seems to include a rectangular prism and an extruded triangle (or possibly a rectangular prism attached to a triangular prism, without information about the orientation of the shapes, we cannot be certain).
For example, if it were a rectangular prism attached to a triangular prism, we would find the volume of both separately and then add them together. The volume of the rectangular prism would be found by length*width*height (12 in*4 in*3 in=144 in³). The volume of triangular prism would be 1/2*base*height*length (1/2*4 in*3 in*7 in = 42 in³). Adding them together, the volume of the composite figure would be 186 in³.
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May someone plz help me
Answer:
y = -1/2 x +5
10 weeks
Step-by-step explanation:
The y intercept is 5 ( That is is the point where x=0)
Our slope is rise over run or 1 lb /2 weeks
We know this is negative because the cat is losing the weight
slope = -1/2
The equation in slope intercept form is
y= mx + b where m is the slope and b is the y intercept
y = -1/2 x +5
We need to determine when y=0 to find when the cat loses all 5 lbs
0 = -1/2 x +5
Subtract 5 from each side
0-5 = -1/2x +5-5
-5 = -1/2x
Multiply each side by -2 to get x alone
-5 *-2 = -1/2x * -2
10 = x
It will take 10 weeks
Answer:
y = -1/2x + 5
It will take 10 weeks for the cat to lose 5 pounds.
Step-by-step explanation:
Find slope
Take 2 points (2,4) (6,2)
y2 - y1/x2 - x12 - 4/6 - 2slope = -1/2
y-intercept
(0,5)
y = mx + b form
m represents slope
b represents y-intercept
y = -1/2x + 5
Find the number of weeks it will the cat to lose 5 pounds
Set y = to 0, to find when the cat loses weight
0 = -1/2x + 5
Subtract 5 in both sides
-5 = -1/2x
Isolate the variable by getting rid of the denominator
-1/2x * 2 = -x
2 * - 5 = -10
Simplify
-x = -10
Divide both sides by -1
-x/-1 = x
-10/-1 = 10
Simplify
x = 10
Answer
It will take 10 weeks for the cat to lose 5 pounds
Shirley is drawing triangles that have the same area. the base of each triangle inversely with the heigh. what are the possible base and height of a second triangle if the first triangles base is 12 and its height is 8.
select one:
a. 120 and 80
b. 10 and 10
c. 60 and 36
b. 16 and 6
Answer:
A
Step-by-step explanation:
they're proportional
Answer: the answer is A
Step-by-step explanation:
have a good day
Which equation can be solved by using this expression?
Answer:
The correct answer option is B. 2 = 3x + 10x^2
Step-by-step explanation:
We are to determine whether which of the given equations in the answer options can be solved using the following expression:
[tex]x=\frac{-3 \pm\sqrt{(3)^2+4(10)(2)} }{2(10)}[/tex]
Here, [tex]a = 10, b = 3[/tex] and [tex]c=-2[/tex].
These requirements are fulfilled by the equation 4 which is:
[tex]12=3x+10x^2[/tex]
Rearranging it to get:
[tex]10x^2+3x-2=0[/tex]
Substituting these values of [tex]a,b,c[/tex] in the quadratic formula:
[tex]x= \frac{-b \pm \sqrt{b^2-4ac} }{2a}[/tex]
[tex]x= \frac{-3 \pm\sqrt{(3)^2-4(10)(-2)} }{y}[/tex]
Find the value 7+3^2(-5+1)divided by 2
The expression 7 + 3^2(-5 + 1) divided by 2 equals -14.5, after calculating the exponent, solving the parenthesis, multiplying, adding to 7, and then dividing by 2.
Explanation:To find the value of the expression 7 + 32(-5 + 1) divided by 2, follow these steps:
Calculate the exponent: 32 = 9.Solve the parenthesis: (-5 + 1) = -4.Multiply the results from steps 1 and 2: 9 * -4 = -36.Add the result from step 3 to 7: 7 - 36 = -29.Finally, divide by 2: -29 / 2 = -14.5.The value of the expression is -14.5.
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Solve the following system using the elimination method: 2x-4y=2 -4x+6y=-4
Answer:
(1, 0)
Step-by-step explanation:
Given the 2 equations
2x - 4y = 2 → (1)
- 4x + 6y = - 4 → (2)
Multiplying (1) by 2 and adding to (2) will eliminate the x- term
4x - 8y = 4 → (3)
Add (2) and (3) term by term
(- 4x + 4x) + (6y - 8y) = (- 4 + 4), simplifying gives
- 2y = 0 ⇒ y = 0
Substitute y = 0 in (1) or (2)
Substituting in (1) gives
2x - 0 = 2, that is
2x = 2 ( divide both sides by 2 )
x = 1
Solution is (1, 0 )
A translation is shown on the grid below.
Which are true statements about the translation?
1 The sides of the image and preimage are congruent.
2 The image is turned 90 degrees.
3 The angles in the image are different from the angles in the pre-image
4 The image is a slide of the preimage.
5 The image has a different shape than the pre-image
6 Each point has moved in a different direction.
7 Each point has moved the same number of units.
Answer:
The correct options are 1, 4 and 7.
Step-by-step explanation:
From the given figure it is clear that the vertices of preimage are A(-4,2), B(-4,-2) and C(-1,-2).
The vertices of image are A'(1,5), B'(1,1) and C'(4,1).
The relation between vertices of preimage and image is defined by the rule
[tex](x,y)\rightarrow (x+5,y+3)[/tex]
It means the figure ABC translated 5 units right and 3 units up.
Translations a rigid transformation. It means the size and shape of image and preimage are same.
We can say that,
(a) The sides of the image and preimage are congruent.
(b) The angles in the image and angles in the pre-image are same.
(c) The image is a slide of the preimage.
(d) The image and pre-image have same shape.
(e) Each point has moved in same direction.
(f) Each point has moved the same number of units.
Therefore the correct options are 1, 4 and 7.
Solve sin2∅=sin∅ on the interval 0≤x< 2[tex]\pi[/tex] .
a. 0,[tex]\frac{\pi }{3}[/tex]
b. 0, [tex]\pi[/tex], [tex]\frac{\pi }{3}[/tex], [tex]\frac{5\pi }{3}[/tex]
c. 0, [tex]\pi[/tex], [tex]\frac{2\pi }{3}[/tex],[tex]\frac{4\pi }{3}[/tex]
d. [tex]\frac{3\pi }{2}[/tex], [tex]\frac{\pi }{2}[/tex],[tex]\frac{\pi }{6}[/tex], [tex]\frac{5\pi }{6}[/tex]
Answer:
[tex]\large\boxed{b.\ 0,\ \pi,\ \dfrac{\pi}{3},\ \dfrac{5\pi}{3}}[/tex]
Step-by-step explanation:
[tex]\text{Use}\ \sin2x=2\sin x\cos x\\\\\sin2\O=\sin\O\\\\2\sin\O\cos\O=\sin\O\qquad\text{subtract}\ \sin\O\ \text{from both sides}\\\\2\sin\O\cos\O-\sin\O=0\qquad\text{distribute}\\\\\sin\O(2\cos\O-1)=0\iff\sin\O=0\ \vee\ 2\cos\O-1=0[/tex]
[tex]\sin\O=0\iff\O=0\ \vee\ \O=\pi\\\\2\cos\O-1=0\qquad\text{add 1 to both sides}\\\\2\cos\O=1\qquad\text{divide both sides by 2}\\\\\cos\O=\dfrac{1}{2}\iff\O=\dfrac{\pi}{3}\ \vee\ \O=\dfrac{5\pi}{3}[/tex]
help !! I can’t find the answer
Answer:
385/pi
Step-by-step explanation:
Circumference is given by
C= pi * d where d is the diameter
385 = pi *d
Divide each side by pi
385/pi = pi * d/pi
385/pi = d
Which angle is coternal with 130 degrees?
Answer:
- 230°
Step-by-step explanation:
A coterminal angle is the given angle ± 360n ( where n is an integer )
Given 130°
Then a coterminal angle = 130° - 360° = - 230°
OR 130° + 360° = 490°
- 18
A scientist rolls two balls A and B down two different ramps. Ball A rolls 4 meters in the 1st second, 9 meters in the 2nd second, 14
meters in the 3rd second, and so on. Ball B rolls 3.5 meters in the 1st second, 6.5 meters in the 2nd second, 9.5 meters in the 3rd
second, and so on. How many meters would each ball roll in 10 seconds?
Select one
a. A: 49 m: B: 305 m
b. A: 54 m; B: 33.5 m
CA: 59 m: B: 36.5 m
d. A: 85 m: B: 72 m
Answer:
a. A. 49m B 30.5 m
Step-by-step explanation:
If I have understood the question correctly:
Ball A:
After each second the total distance travelled increases by 5 meters.
Ball A: after 10 seconds it has rolled 4 + (10-1) * 5 = 49m
Ball B: after 10 seconds it has rolled 3.5 + (10-1)* 3 = 30.5 m.
Answer:
Option A. A: 49 m: B: 30.5 m
Step-by-step explanation:
Ball A rolls 4 meters in the 1st second, 9 meters in the 2nd second, 14 meters in the 3rd second, and so on.
We can see that after each second the total distance traveled by ball increases by 5 meters.
So, we can solve this as an arithmetic sequence that is [tex]a+(n-1)d[/tex]
For ball A, a = 4 n = 10 d = 5
Ball B rolls 3.5 meters in the 1st second, 6.5 meters in the 2nd second, 9.5 meters in the 3rd second, and so on.
For ball B, a = 3.5 n = 10 d = 3
For ball A:
After 10 seconds, the distance will be [tex]4+(10-1)5[/tex]
= [tex]4+45[/tex] = 49 meters
For ball B:
After 10 seconds, distance covered will be [tex]3.5+(10-1)3[/tex]
= [tex]3.5+27[/tex] = 30.5 meters.
Hence, the answer is option A.
What are the solutions to the equation 3(x-4)^2=27
Answer:
x=1, x=7
Step-by-step explanation:
Firstly, you can simplify by dividing both sides by 3, which will make the equation easier to simplify:
(x-4)^2=9
Next, you can take the square root of each side, which will cancel the square, and make the 9 even easier to work with:
(x-4)=(± )3
*Note the (± ) sign, this is because there is a positive and negative answer*
After this, you will basically have two equations:
(x-4)=3
and
(x-4)=-3
You are going to solve both to get both answers, but lets start with the positive first:
x-4=3 Add 4 to both sides to get an x= equation
x=7
And it's the same thing for the negative:
x-4=-3 Add 4 to both sides to get an x= equation
x=1
Hope this helps
Final answer:
To solve the equation 3(x-4)²=27, divide by 3 to get (x-4)²=9, then take the square root to find the solutions x=7 and x=1.
Explanation:
When we're tasked with solving a quadratic equation, such as 3(x-4)²=27, we first need to get it into the standard form of a quadratic equation, which is ax² + bx + c = 0. To do so in this case, we can divide both sides of the equation by 3 to isolate the squared term, yielding (x-4)²= 9. We then take the square root of both sides, giving us x - 4 =3. Solving for x results in two solutions: x = 4 + 3 and x = 4 - 3, which simplifies to x = 7 and x = 1 respectively. These are the solutions to the given equation.
To verify these solutions, you can substitute them back into the original equation to ensure that they satisfy the equation, which in this case, they will. This critical step confirms the accuracy of our solutions.
You have a total of $1760 to invest. Account A pays 7% annual interest and account B pays 4% annual interest. How much should you invest in each account if you would like the investment to earn $ 95 at the end of one year? Let A represent the amount of money invested in the account that earns 7% annual interest and let B represent the amount of money invested in the account that earns 4% annual interest. Complete the system of linear equations to solve the problem.
Answer:
You should invest $820 in account A and $940 in account B
Step-by-step explanation:
* Lets use the system of linear equations to solve the problem
- Simple Interest Equation I = Prt , Where:
# P = Invested Amount
# I = Interest Amount
# r = Rate of Interest per year in decimal; r = R/100
# t = Time Period involved in months or years
* Lets solve the problem
- The total money invested is $1760
- Account A pays 7% annual interest
- Account B pays 4% annual interest
- Let A represent the amount of money invested in the account A
- Let B represent the amount of money invested in the account B
- You would like to earn $ 95 at the end of one year
∴ The interest from both accounts at the end of one year is $95
- Lets write the equations
# Account A :
∵ Account A has $A invested
∴ P = $A
∵ Account A pays 7% annual interest
∴ r = 7/100 = 0.07
∵ t = 1 year
∵ I = Prt
∴ I = A(0.07)(1) = 0.07A
# Account B :
∵ Account B has $B invested
∴ P = $B
∵ Account A pays 4% annual interest
∴ r = 4/100 = 0.04
∵ t = 1 year
∵ I = Prt
∴ I = B(0.04)(1) = 0.04B
- The total amount of interest from both accounts at the end of one
year is $95
∴ I from A + I from B = 95
∴ 0.07A + 0.04B = 95 ⇒ multiply both sides by 100
∴ 7A + 4B = 9500 ⇒ (1)
- The total money to invest in both accounts is $1760
∵ Account A has $A invested
∵ Account B has $B invested
∴ A + B = 1760 ⇒ (2)
* Lets solve the system of equations to find the amount of money
invested in each account
- Multiply equation (2) by -4 to eliminate B
∵ A + B = 1760 ⇒ × -4
∴ -4A - 4B = -7040 ⇒ (3)
- Add equation (1) and (3)
∵ 7A + 4B = 9500 ⇒ (1)
∵ -4A - 4B = -7040 ⇒ (3)
∴ 7A - 4A = 9500 - 7040
∴ 3A = 2460 ⇒ divide both side by 3
∴ A = 820
- Substitute the value of A in equation (1) or (2)
∵ A + B = 1760 ⇒ (2)
∴ 820 + B = 1760 ⇒ subtract 820 from both sides
∴ B = 940
- From all above
* You should invest $820 in account A and $940 in account B
Peter and Angad win some money and share it in the ratio 6:1. Peter gets £30 more than Angad. How much did they get altogether?
Final answer:
The total amount of money Peter and Angad won and shared in the ratio 6:1, with Peter getting £30 more than Angad, is £72.
Explanation:
Peter and Angad win some money and share it in the ratio of 6:1. If Peter gets £30 more than Angad, to find out how much they got altogether, we can use this ratio to express their winnings in terms of algebra. Let the amount Angad gets be x. Then Peter gets x+£30 since he gets £30 more than Angad. According to the ratio 6:1, Peter's share would be 6 times Angad's share; this gives us the equation 6x = x+ £30.
To solve for x, combine like terms: 6x - x = £30, which simplifies to 5x = £30. Divide both sides by 5 to find x: x = £6. Now that we know Angad receives £6, we can find Peter's share by multiplying Angad's share by 6: 6*£6 = £36. Add the £30 difference to get Peter's total: £36+£30 = £66.
To find the total amount they got altogether, add Angad's share and Peter's share together: £66 + £6 = £72.
Which polynomial represents the sum below (4x^2+1)+(4x^2+x+2)
Answer:
8x^2 + x + 3.
Step-by-step explanation:
(4x^2+1)+(4x^2+x+2)
= 8x^2 + x + 2 + 1
= 8x^2 + x + 3.
Answer:
The polynomial [tex]8x^2+x+3[/tex] represents the sum of given expression.
Step-by-step explanation:
The given expression is
[tex](4x^2+1)+(4x^2+x+2)[/tex]
We need to find the sum of given polynomials.
Open the brackets.
[tex]4x^2+1+4x^2+x+2[/tex]
Combine like terms.
[tex](4x^2+4x^2)+x+(1+2)[/tex]
On further simplification we get
[tex]8x^2+x+3[/tex]
Therefore the polynomial [tex]8x^2+x+3[/tex] represents the sum of given expression.
Jacob is calculating the amount of time it takes a rocket to get to the moom
Answer:
16 hours
Step-by-step explanation:
Speed=distance/time
Let S be speed, D be distance, and t be time.
Let's solve the speed equation for t since we are looking for time, t.
[tex]S=\frac{D}{t}[/tex]
Multiply both sides by t:
[tex]St=D[/tex]
Divide both sides by S:
[tex]t=\frac{D}{S}[/tex]
So our distance is 239000 and our speed is 250 so plug them in:
[tex]t=\frac{239000}{250}[/tex]
Putting into the calculator now:
t=956 minutes (I knew this was in minutes because the speed was 250 miles per minute)
We need to convert this to hours. 60 minutes=1 hour.
60 minutes=1 hour
956 minutes=x hours
You can setup a proportion if you don't know you just need to take 956 and divide it by 60. Like so:
[tex]\frac{60}{956}=\frac{1}{x}[/tex]
Cross multiply:
[tex]60x=956(1)[/tex]
[tex]60x=956[/tex]
Divide both sides by 60:
[tex]x=\frac{956}{60}[/tex]
Putting into calculator now:
x=15.9333333333333 which mean we have almost 16 hours
Which inequality is not true? -7/8 > -0.50 -7/8 < -0.60 -7/8 < -1/4 -7/8 > -15/16
Solve 2x-3/5=x+6 ASAP
Answer:
Problem 1: [tex]\frac{2x-3}{5}=x+6[/tex] gives x=-11
Problem 2: [tex]2x-\frac{3}{5}=x+6[/tex] gives x=33/5
Step-by-step explanation:
I will do it both ways:
Problem 1:
[tex]\frac{2x-3}{5}=x+6[/tex]
I don't like the fraction so I'm going to clear by multiplying both sides by 5:
[tex]2x-3=5(x+6)[/tex]
Distribute:
[tex]2x-3=5x+30[/tex]
Subtract 2x on both sides:
[tex]-3=3x+30[/tex]
Subtract 30 on both sides:
[tex]-33=3x[/tex]
Divide both sides by 3:
[tex]-11=x[/tex]
Problem 2:
[tex]2x-\frac{3}{5}=x+6[/tex]
Clear the fraction by multiplying both sides by 5:
[tex]5(2x-\frac{3}{5})=5(x+6)[/tex]
Distribute:
[tex]10x-3=5x+30[/tex]
Subtract 5x on both sides:
[tex]5x-3=30[/tex]
Add 3 on both sides:
[tex]5x=33[/tex]
Divide both sides by 5:
[tex]x=\frac{33}{5}[/tex]
For this case we must solve the following equation:
[tex]\frac {2x-3} {5} = x + 6[/tex]
Multiplying by 5 on both sides we have:
[tex]2x-3 = 5 (x + 6)\\2x-3 = 5x + 30[/tex]
We add 3 to both sides of the equation:
[tex]2x = 5x + 30 + 3\\2x = 5x + 33[/tex]
Subtracting 5x on both sides:
[tex]2x-5x = 33\\-3x = 33[/tex]
Dividing between -3 on both sides:
[tex]x = \frac {33} {- 3}\\x = -11[/tex]
Answer:
-11