Answer:
The boutique charges $64 for a wallet, and $25 for a belt.
Step-by-step explanation:
We can write two equations using the information we are given. The we solve the system of equations to find the prices.
Let w = price of 1 wallet.
Let b = price of 1 belt.
"Last month, the company sold 25 wallets and 62 belts, for a total of $3,150."
25w + 62b = 3150
"This month, they sold 78 wallets and 19 belts, for a total of $5,467."
78w + 19b = 5467
We now have the following system of 2 equations in 2 unknowns.
25w + 62b = 3150
78w + 19b = 5467
We will use the substitution method.
Solve the first equation for w.
25w + 62b = 3150
25w = -62b + 3150
w = -62/25 b + 126
Now substitute w with -62/25 b + 126 in the second equation, and solve for b.
78w + 19b = 5467
78(-62/25 b + 126) + 19b = 5467
-4836/25 b + 9828 + 19b = 5467
-4836/25 b + 19b = -4361
Multiply both sides by 25.
-4836b + 475b = -109,025
4361b = 109,025
b = 25
Now we substitute 25 for b in the first original equation and solve for w.
25w + 62b = 3150
25w + 62(25) = 3150
25w + 1550 = 3150
25w = 1600
w = 64
Answer: The boutique charges $64 for a wallet, and $25 for a belt.
What is the relationship between two lines whose slopes are −8 and 1 8 ?
Answer:
They are perpendicular lines
Step-by-step explanation:
If one line has slope -8 and the other one has slope 1/8, they must be perpendicular to each other because the condition for perpendicular lines is that the slope of one must be the "opposite of the reciprocal of the slope of the original line."
the opposite of -8 is 8 , and the reciprocal of this is 1/8
Answer:
Below
Step-by-step explanation:
Let m and m' be the slopes of two different lines.
These lines are peependicular if and only if:
● m×m' = -1
Notice that:
● -8 ×(1/8) = -1
So the lines with the respectives slopes -8 and 1/8 are perpendicular.
Directions: Simplify each expression by distributing
1. 8(x + 5) =
3.-2(3m + 9) =
Answer:
8x +40-6m-18Step-by-step explanation:
[tex]8(x + 5) = \\ 8(x) + 8(5) \\ = 8x + 40[/tex]
[tex] - 2(3m + 9) \\ = - 2(3m) - 2(9) \\ = - 6m - 18[/tex]
Rewrite 7.13 as a mixed number in lowest terms
Hey there! I'm happy to help!
A mixed number is a whole number and a fraction. We already see that our whole number is 7.
Our decimal is 0.13. Since this goes into the hundredths place, we can rewrite this as 13/100. This cannot be simplified anymore.
Therefore, 7.13 is 7 13/100 in lowest terms.
Have a wonderful day! :D
given that x+1 is a factor of 3x³-14x²-7x+d, show that d= 10
Answer:
3x³ - 14x² - 7x + d = (x + 1)(ax² + bx + c)
--------------------------
(x + 1)(ax² + bx + c)
= ax³ + bx² + cx + ax² + bx + c
= ax³ + (a + b)x² + (b + c)x + c
--------------------------
ax³ + (a + b)x² + (b + c)x + c = 3x³ - 14x² - 7x + d
=> a = 3
a + b = -14
b + c = -7
c = d
=> a = 3, b = -17, c = 10, d = 10
if sina=4/5 find the cosa
Answer:
cos A = 3/5
Step-by-step explanation:
sin A = 4/5
sin^2 A + cos^2 A = 1
(4/5)^2 + cos^2 A = 1
16/25 + cos^2 A = 1
cos^2 A = 9/25
cos A = 3/5
Explain a situation when the absolute value of a number might be negative. Explain using examples, relevant details, and supporting evidence. RACE Format Its for a CRQ
The absolute value of any number is never negative. Absolute value represents distance, and negative distance is not possible (it doesn't make any sense to have a negative distance). Specifically, it is the distance from the given number to 0 on the number line.
The result of an absolute value is either 0 or positive.
Examples:
| -22 | = 22
| -1.7 | = 1.7
| 35 | = 35
The vertical bars surrounding the numbers are absolute value bars
In 2014, Chile experienced an intense earthquake with a magnitude of 8.2 on the Richter scale. In 2010, Haiti also experienced an intense earthquake that measured 7.0 on the Richter scale. Compare the intensities of the two earthquakes. Use a logarithmic model to solve. Round to the nearest whole number.
Answer:
The intensity of the earthquake in Chile was about 16 times the intensity of the earthquake in Haiti.
Step-by-step explanation:
Given:
magnitude of earthquake in Chile = 8.2
magnitude of earthquake in Haiti = 7.0
To find:
Compare the intensities of the two earthquakes
Solution:
The magnitude R of earthquake is measured by R = log I
R is basically the magnitude on Richter scale
I is the intensity of shock wave
For Chile:
given magnitude R of earthquake in Chile = 8.2
R = log I
8.2 = log I
We know that:
[tex]y = log a_{x}[/tex] is equivalent to: [tex]x = a^{y}[/tex]
[tex]R = log I[/tex]
8.2 = log I becomes:
[tex]I = 10^{8.2}[/tex]
So the intensity of the earthquake in Chile:
[tex]I_{Chile} = 10^{8.2}[/tex]
For Haiti:
R = log I
7.0 = log I
We know that:
[tex]y = log a_{x}[/tex] is equivalent to: [tex]x = a^{y}[/tex]
[tex]R = log I[/tex]
7.0 = log I becomes:
[tex]I = 10^{7.0}[/tex]
So the intensity of the earthquake in Haiti:
[tex]I_{Haiti} = 10^{7}[/tex]
Compare the two intensities :
[tex]\frac{I_{Chile} }{I_{Haiti} } }[/tex]
[tex]= \frac{10^{8.2} }{10^{7} }[/tex]
= [tex]10^{8.2-7.0}[/tex]
= [tex]10^{1.2}[/tex]
= 15.848932
Round to the nearest whole number:
16
Hence former earthquake was 16 times as intense as the latter earthquake.
Another way to compare intensities:
Find the ratio of the intensities i.e. [tex]\frac{I_{Chile} }{I_{Haiti} } }[/tex]
[tex]log I_{Chile}[/tex] - [tex]log I_{Haiti}[/tex] = 8.2 - 7.0
[tex]log(\frac{I_{Chile} }{I_{Haiti} } })[/tex] = 1.2
Convert this logarithmic equation to an exponential equation
[tex]log(\frac{I_{Chile} }{I_{Haiti} } })[/tex] = 1.2
[tex]10^{1.2}[/tex] = [tex]\frac{I_{Chile} }{I_{Haiti} } }[/tex]
Hence
[tex]\frac{I_{Chile} }{I_{Haiti} } }[/tex] = 16
Answer:
The intensity of the 2014 earthquake was about 16 times the intensity of the 2010 earthquake
Step-by-step explanation:
−3 3/8−7/8 what is it
Greetings from Brasil...
First, let's make the mixed fraction improper:
- (3 3/8)
- { [(8 · 3) + 3]/8}
- { [24 + 3]/8}
- {27/8}
- (3 3/8) - (7/8)
- (27/8) - (7/8)
as the denominators are equal, we operate only with the numerators
- 34/8 simplifying
- 17/4Answer:
- 4 ¹/₄Step-by-step explanation:
-3 3/8 - 7/8
convert -3 3/8 to improper fractions
_ 27 _ 7
8 8
_ 27 - 7
8
simplify
_ 34
8
convert to proper factions
_ 17
4
- 4 ¹/₄
what is the square root of 80 simplified to?
Answer:
4√5
Step-by-step explanation:
√80 = √4·4·5 = √4²·5 = 4√5
water flows into a tank 200m by 150m through a rectangular pipe 1.5m by 1.25m at 20kmph. in what time (in minutes) will the water rise by 2 meters
Answer:
Volume required in the tank (200 × 150 × 2)m3. therefore, required time= (6000/625)= 96 min.
what is the LCM for 3 and 8
Answer: The LCM of 3 and 8 is 24.
Step-by-step explanation:
So far, the given two numbers are 3 and 8. We have to find the LCM ( Least Common Multiple ) of 3 and 8, not the GCF ( Greatest Common Factor). That means, we have to find the smallest multiple of 3 and 8.
Let's try it out.
3 times 1 = 3. Is that a multiple of eight? No.
3 times 2 = 6. Is that a multiple of eight? No.
3 times 3 = 9. Is that a multiple of eight? No.
3 times 4 = 12. Is that a multiple of eight? No.
3 times 5 = 15. Is that a multiple of eight? No.
3 times 6 = 18. Is that a multiple of eight? No.
3 times 7 = 21. Is that a multiple of eight? No.
3 times 8 = 24. Is that a multiple of eight? YES!
Now try it out for 8.
8 times 1 = 8. Is that a multiple of three? No.
8 times 2 = 16. Is that a multiple of three? No.
8 times 3 = 24. Is that a multiple of three? YES!
So now that 24 occurs in the list for both of them, it is the LCM because there are no other numbers that come before it that are multiples of both 3 and 8.
The LCM of 3 and 8 is 24.
What is the LCM for 3 and 8?The LCM (Least Common Multiple) of two numbers is the smallest number that is a multiple of both numbers.
To find the LCM of 3 and 8, we can use the following steps:
1. List out the multiples of 3 until we reach a number that is divisible by 8.
2. List out the multiples of 8 until we reach a number that is divisible by 3.
3. The smallest number that appears in both lists is the LCM of 3 and 8.
The multiples of 3 are 3, 6, 9, 12, 15, 18, 21, 24, 27...
The multiples of 8 are 8, 16, 24, 32 ...
The smallest number that appears in both lists is 24. Therefore, the LCM of 3 and 8 is 24.
Learn more about LCM on:
https://brainly.com/question/29231098
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What is the result of the product of 21 and x added to twice of 6?
Answer:
21x + 12
Step-by-step explanation:
In math, it is
21x + 2(6).
so we have
21x + 2(6) = 21x + 12.
Solve the system by using a matrix equation.
--4x - 5y = -5
-6x - 8y = -2
Answer:
Solution : (15, - 11)
Step-by-step explanation:
We want to solve this problem using a matrix, so it would be wise to apply Gaussian elimination. Doing so we can start by writing out the matrix of the coefficients, and the solutions ( - 5 and - 2 ) --- ( 1 )
[tex]\begin{bmatrix}-4&-5&|&-5\\ -6&-8&|&-2\end{bmatrix}[/tex]
Now let's begin by canceling the leading coefficient in each row, reaching row echelon form, as we desire --- ( 2 )
Row Echelon Form :
[tex]\begin{pmatrix}1\:&\:\cdots \:&\:b\:\\ 0\:&\ddots \:&\:\vdots \\ 0\:&\:0\:&\:1\end{pmatrix}[/tex]
Step # 1 : Swap the first and second matrix rows,
[tex]\begin{pmatrix}-6&-8&-2\\ -4&-5&-5\end{pmatrix}[/tex]
Step # 2 : Cancel leading coefficient in row 2 through [tex]R_2\:\leftarrow \:R_2-\frac{2}{3}\cdot \:R_1[/tex],
[tex]\begin{pmatrix}-6&-8&-2\\ 0&\frac{1}{3}&-\frac{11}{3}\end{pmatrix}[/tex]
Now we can continue canceling the leading coefficient in each row, and finally reach the following matrix.
[tex]\begin{bmatrix}1&0&|&15\\ 0&1&|&-11\end{bmatrix}[/tex]
As you can see our solution is x = 15, y = - 11 or (15, - 11).
Otto used 6 cups of whole wheat flower an x cups of white flower in the recipe. What is the equation that can be used to find the value of y, an the constraints on the values of x an y??
Answer:
idk
Step-by-step explanation:
the diagram shows a sector of a circle, center O,radius 5r the length of the arc AB 4r. find the area of the sector in terms of r , giving your answer in its simplest form
Answer:
10r²
Step-by-step explanation:
The following data were obtained from the question:
Radius (r) = 5r
Length of arc (L) = 4r
Area of sector (A) =?
Next, we shall determine the angle θ sustained at the centre.
Recall:
Length of arc (L) = θ/360 × 2πr
With the above formula, we shall determine the angle θ sustained at the centre as follow:
Radius (r) = 5r
Length of arc (L) = 4r
Angle at the centre θ =?
L= θ/360 × 2πr
4r = θ/360 × 2π × 5r
4r = (θ × 10πr)/360
Cross multiply
θ × 10πr = 4r × 360
Divide both side by 10πr
θ = (4r × 360) /10πr
θ = 144/π
Finally, we shall determine the area of the sector as follow:
Angle at the centre θ = 144/π
Radius (r) = 5r
Area of sector (A) =?
Area of sector (A) = θ/360 × πr²
A = (144/π)/360 × π(5r)²
A = 144/360π × π × 25r²
A = 144/360 × 25r²
A = 0.4 × 25r²
A = 10r²
Therefore, the area of the sector is 10r².
the area of the sector in terms of r is [tex]10r^2[/tex]
Given :
From the given diagram , the radius of the circle is 5r and length of arc AB is 4r
Lets find out the central angle using length of arc formula
length of arc =[tex]\frac{central-angle}{360} \cdot 2\pi r[/tex]
r=5r and length = 4r
[tex]4r=\frac{central-angle}{360} \cdot 2\pi (5r)\\4r \cdot 360=central-angle \cdot 2\pi (5r)\\\\\\\frac{4r \cdot 360}{10\pi r} =angle\\angle =\frac{4\cdot 36}{\pi } \\angle =\frac{144}{\pi }[/tex]
Now we replace this angle in area of sector formula
Area of sector =[tex]\frac{angle}{360} \cdot \pi r^2\\[/tex]
[tex]Area =\frac{angle}{360} \cdot \pi r^2\\\\Area =\frac{\frac{144}{\pi } }{360} \cdot \pi\cdot 25r^2\\\\Area =\frac{ 144 }{360\pi } \cdot \pi\cdot 25r^2\\\\Area =\frac{ 2 }{5 } \cdot 25r^2\\\\\\Area=10r^2[/tex]
So, the area of the sector in terms of r is [tex]10r^2[/tex]
Learn more : brainly.com/question/23580175
i need help someone= R-7=1
Answer: R=8
Step-by-step explanation:
-7 is added to 1 making it R= 1+7 resulting in R=8
Answer:
[tex]\huge \boxed{R=8}[/tex]
Step-by-step explanation:
[tex]R-7=1[/tex]
Adding 7 to both sides of the equation.
[tex]R-7+7=1+7[/tex]
[tex]R=8[/tex]
Solve for x. Evaluate and round your answer to 1 decimal place(tenths place). 10x=1200
Answer:
x = 3.1Step-by-step explanation:
[tex] {10}^{x} = 1200[/tex]To solve first take logarithm to both sides
That's
[tex] log_{10}(10) ^{x} = log_{10}(1200) [/tex][tex] log_{10}(10)^{x} = x log_{10}(10) [/tex]But
[tex] log_{10}(10) = 1[/tex]So we have
[tex]x = log_{10}(1200) [/tex]
Write 1200 as a number with the factor 100
That's
1200 = 100 × 12
So we have
[tex]x = log_{10}(100 \times 12) [/tex]Using the rules of logarithms
That's
[tex] log_{a}(x \times y) = log_{a}(x) + log_{a}(y) [/tex]Rewrite the expression
That's
[tex]x = log_{10}(100) + log_{10}(12) [/tex][tex]x = log_{10}(10)^{2} + log_{10}(12) [/tex][tex]x = 2 log_{10}(10) + log_{10}(12) [/tex][tex] log_{10}(10) = 1[/tex][tex]x = 2 + log_{10}(12) [/tex]x = 3.079
So we have the final answer as
x = 3.1 to one decimal placeHope this helps you
Can you please help me !
Step-by-step explanation:
Question no 1 ans is -10.
Question no 2 ans is 14.
Question no 3 ans is 7.
Question no 4 ans is 14.
A city has a population of people. Suppose that each year the population grows by . What will the population be after years?
Answer:
The question is missing the values, I found a possible matching question:
a city has a population of 380,000 people. suppose that each year the population grows by 7.5%. what will be the population after 6 years
Answer:
After 6 years, the population will be 586, 455 people
Step-by-step explanation:
This growth is similar to the growth of an invested amount of money, which is compounded annually, yielding a future value, when it increases by a certain interest rate. Hence the formula for compound interest is used to determine the population after 6 years as follows:
[tex]FV = PV (1+ \frac{r}{n})^({n \times t})[/tex]
where
FV = future value = population after 6 years = ???
PV = present value = current population = 380,000 people
r = interest rate = growth rate = 7.5% = 7.5/100 = 0.075
n = number of compounding periods per year = annually = 1
t = time of growth = 6 years
[tex]FV = 380,000 (1+ \frac{0.075}{1})^({1 \times 6})\\FV = 380,000 (1.075)^{6}\\FV= 380,000 (1.5433015256)\\FV = 586,454.58\\FV= 586,455\ people[/tex]
Therefore, after 6 years, the population will be 586, 455 people
Write two expressions for the perimeter of the figure.
2x
7
3x
172
16
Note: The figure is not drawn to scale.
(a) Use all five side lengths.
perimeter - ] + + + +
(b) Simplify the expression from part (a).
perimeter =
Х
$ ?
Answer:
Two expressions for the perimeter would be
22x+23 and 2x+3x+17x+7+16
Step-by-step explanation:
you want to add the variables of the same kind in this case
2x
3x 7
17x 16
_________
22x + 23
A student scores on a geography test and on a mathematics test. The geography test has a mean of 80 and a standard deviation of . The mathematics test has a mean of 300 and a standard deviation of . If t
Complete question is;
A student scores 56 on a geography test and 267 on a mathematics test. The geography test has a mean of 80 and a standard deviation of 20. The mathematics test has a mean of 300 and a standard deviation of 22.
If the data for both tests are normally distributed, on which test did the student score better?
Answer:
The geography test is the one in which the student scored better.
Step-by-step explanation:
To solve this question, we will make use if the z-score formula to find the w test in which the student scored better. The z-score formula is;
z = (x - μ)/σ
Now, for geography, we are given;
Test score; x = 56
Mean; μ = 80
Standard deviation; σ = 20
Thus, the z-score here will be;
z = (56 - 80)/20
z = -1.2
Similarly, for Mathematics, we are given;
Test score; x = 267
Mean; μ = 300
Standard deviation; σ = 22
Thus, the z-score here will be;
z = (267 - 300)/22
z = -1.5
Since the z-score for geography is lesser than that of Mathematics, thus, we can conclude that the geography test is the one in which the student scored better.
Select the correct answer from each drop-down menu. Shape I is similar to shape II. The sequence that maps shape I onto shape II is a 180degree clockwise rotation about the origin, and then a dilation by a scale factor of (0.5; 1; 1.5 ; or 2)
Answer:
Scale factor 2.
Step-by-step explanation:
The vertices of shape I are (2,1), (3,1), (4,3), (3,3), (3,2), (2,2), (2,3), (1,3).
The vertices of shape II are (-4,-2), (-6,-2), (-8,-6), (-6,-6), (-6,-4), (-4,-4), (-4,-6), (-2,-6).
Consider shape I is similar to shape II. The sequence that maps shape I onto shape II is a 180 degree clockwise rotation about the origin, and then a dilation by a scale factor of k.
Rule of 180 degree clockwise rotation about the origin:
[tex](x,y)\rightarrow (-x,-y)[/tex]
The vertices of shape I after rotation are (-2,-1), (-3,-1), (-4,-3), (-3,-3), (-3,-2), (-2,-2), (-2,-3), (-1,-3).
Rule of dilation by a scale factor of k.
[tex](x,y)\rightarrow (kx,ky)[/tex]
So,
[tex](-2,-1)\rightarrow (k(-2),k(-1))=(-2k,-k)[/tex]
We know that, the image of (-2,-1) after dilation is (-4,-2). So,
[tex](-2k,-k)=(-4,-2)[/tex]
On comparing both sides, we get
[tex]-2k=-4[/tex]
[tex]k=2[/tex]
Therefore, the scale factor is 2.
Answer:
180 clockwise rotation about the orgin, 2
Step-by-step explanation:
Write an expression for: half of w
2-w
2w
W/2
2/w
Answer:
w/2
Step-by-step explanation:
Calculating half of something is the same as dividing it by 2. In this case, the "something" is w so the answer is w/2.
divide the sum of 3/8 and -5/12 by the reciprocal of -15/8×16/27
Answer:
757
Step-by-step explanation:
Answer:
Step-by-step explanation:
Sum of 3/8 and -5/12:
Least common denominator of 8 & 12 = 24
[tex]\frac{3}{8}+\frac{-5}{12}=\frac{3*3}{8*3}+\frac{-5*2}{12*2}\\\\\\=\frac{9}{24}+\frac{-10}{24}\\\\\\=\frac{-1}{24}[/tex]
Finding -15/8 * 16/27:
[tex]\frac{-15}{8}*\frac{16}{27}=\frac{-5*2}{1*9}=\frac{-10}{9}[/tex]
Reciprocal of -10/9 = -9/10
-1/24 ÷ -9/10 = [tex]\frac{-1}{24}*\frac{-10}{9}=\frac{1*5}{12*3}[/tex]
= [tex]\frac{5}{24}[/tex]
Question 27 (1 point)
(01.05)
What is the slope-intercept form equation of the line that passes through (1,3) and (3, 7)? (1 point)
а. y = -2x + 1
b. y=-2x - 1
с. y = 2x + 1
d. y= 2x - 1
Answer: y=2x+1
Step-by-step explanation:
plug in the points in to the equation to see what you get
1) Determine the discriminant of the 2nd degree equation below:
3x 2 − 2x − 1 = 0
a = 3, b = −2, c = −1
Discriminant → ∆= b 2 − 4 a c
2) Solve the following 2nd degree equations using Bháskara's formula:
Δ = b² - 4.a.c
x = - b ± √Δ
__________
2a
a) x 2 + 5x + 6 = 0
b)x 2 + 2x + 1 = 0
c) x2 - x - 20 = 0
d) x2 - 3x -4 = 0
[tex] \LARGE{ \boxed{ \mathbb{ \color{purple}{SOLUTION:}}}}[/tex]
We have, Discriminant formula for finding roots:
[tex] \large{ \boxed{ \rm{x = \frac{ - b \pm \: \sqrt{ {b}^{2} - 4ac} }{2a} }}}[/tex]
Here,
x is the root of the equation.a is the coefficient of x^2b is the coefficient of xc is the constant term1) Given,
3x^2 - 2x - 1
Finding the discriminant,
➝ D = b^2 - 4ac
➝ D = (-2)^2 - 4 × 3 × (-1)
➝ D = 4 - (-12)
➝ D = 4 + 12
➝ D = 16
2) Solving by using Bhaskar formula,
❒ p(x) = x^2 + 5x + 6 = 0
[tex] \large{ \rm{ \longrightarrow \: x = \dfrac{ - 5\pm \sqrt{( - 5) {}^{2} - 4 \times 1 \times 6 }} {2 \times 1}}}[/tex]
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{ - 5 \pm \sqrt{25 - 24} }{2 \times 1} }}[/tex]
[tex] \large{ \rm{ \longrightarrow \: x = \dfrac{ - 5 \pm 1}{2} }}[/tex]
So here,
[tex]\large{\boxed{ \rm{ \longrightarrow \: x = - 2 \: or - 3}}}[/tex]
❒ p(x) = x^2 + 2x + 1 = 0
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{ - 2 \pm \sqrt{ {2}^{2} - 4 \times 1 \times 1} }{2 \times 1} }}[/tex]
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{ - 2 \pm \sqrt{4 - 4} }{2} }}[/tex]
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{ - 2 \pm 0}{2} }}[/tex]
So here,
[tex]\large{\boxed{ \rm{ \longrightarrow \: x = - 1 \: or \: - 1}}}[/tex]
❒ p(x) = x^2 - x - 20 = 0
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{ - ( - 1) \pm \sqrt{( - 1) {}^{2} - 4 \times 1 \times ( - 20) } }{2 \times 1} }}[/tex]
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{ 1 \pm \sqrt{1 + 80} }{2} }}[/tex]
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{1 \pm 9}{2} }}[/tex]
So here,
[tex]\large{\boxed{ \rm{ \longrightarrow \: x = 5 \: or \: - 4}}}[/tex]
❒ p(x) = x^2 - 3x - 4 = 0
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{ - ( - 3) \pm \sqrt{( - 3) {}^{2} - 4 \times 1 \times ( - 4) } }{2 \times 1} }}[/tex]
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{3 \pm \sqrt{9 + 16} }{2 \times 1} }}[/tex]
[tex]\large{ \rm{ \longrightarrow \: x = \dfrac{3 \pm 5}{2} }}[/tex]
So here,
[tex]\large{\boxed{ \rm{ \longrightarrow \: x = 4 \: or \: - 1}}}[/tex]
━━━━━━━━━━━━━━━━━━━━
Step-by-step explanation:
a)
given: a = 1, b = 5, c = 6
1) Discriminant → ∆= b² − (4*a*c)
∆= b² - (4*a*c)
∆= 5² - (4*1*6)
∆=25 - ( 24 )
∆= 25 - 24
∆= 1
2)
Solve x = (- b ± √Δ ) / 2a
x = ( 5 ± √25 ) / 2*1
x = ( 2 ± 5 ) / 2
x = ( 2 + 5 ) / 2 or x = ( 2 - 5 ) / 2
x = ( 7 ) / 2 or x = ( - 3 ) / 2
x = 3.5 or x = -1.5
b)
given: a = 1, b = 2, c = 1
1) Discriminant → ∆= b² − (4*a*c)
∆= b² - (4*a*c)
∆= 2² - (4*1*1)
∆= 4 - (4)
∆= 4 - 4
∆= 0
2)
Solve x = (- b ± √Δ ) / 2a
x = ( -2 ± √0) / 2*1
x = ( 2 ± 0 ) / 2
x = ( 2 + 0) / 2 or x = ( 2 - 0 ) / 2
x = ( 2 ) / 2 or x = ( 2 ) / 2
x = 1 or x = 1
x = 1 (only one solution)
c)
given: a = 1, b = -1, c = -20
1) Discriminant → ∆= b² − (4*a*c)
∆= b² - (4*a*c)
∆= -1² - (4*1*-20)
∆= 1 - ( -80 )
∆= 1 + 80
∆= 81
2)
Solve x = (- b ± √Δ ) / 2a
x = ( 2 ± √81 ) / 2*1
x = ( 2 ± 9 ) / 2
x = ( 2 + 9 ) / 2 or x = ( 2 - 9 ) / 2
x = ( 11 ) / 2 or x = ( - 7 ) / 2
x = 5.5 or x = -3.5
d)
given: a = 1, b = -3, c = -4
1) Discriminant → ∆= b² − (4*a*c)
∆= b² - (4*a*c)
∆= -3² - (4*1*-4)
∆= 9 - ( -16)
∆= 9 + 16
∆= 25
2)
Solve x = (- b ± √Δ ) / 2a
x = ( 3 ± √25 ) / 2*1
x = ( 3 ± 5 ) / 2
x = ( 3 + 5 ) / 2 or x = ( 3 - 5 ) / 2
x = ( 8 ) / 2 or x = ( - 2 ) / 2
x = 4 or x = -1
In predicate calculus, arguments to predicates and functions can only be terms - that is, combinations of __. Select one: a. predicates and connectives b. constants and predicates c. variables, constants, and functions d. predicates, quantifiers, and connectives
Answer:
c. variables, constants, and functions
Step-by-step explanation:
A predicate is the property that some object posses. Predicate calculus is a kind of logic that combines the categorical logic with propositional logic. The formal syntax of a predicate calculus contains 3 Terms which consist of:
1. Constants and Variables
2. Connectives
3. Quantifiers
But in arguments to predicates and functions, the terms can only be combination of variables, constants, and functions.
Imagine these are your students' test scores (out of 100): 63, 66, 70, 81, 81, 92, 92, 93, 94, 94, 95, 95, 95, 96, 97, 98, 98, 99, 100, 100, 100. What can you conclude regarding their distribution? (HINT: The mean is ~ 90; The median = 95)
Answer:
The mean ≈ 90
The median = 95
The mode = 95 & 100
The range = 37
Step-by-step explanation:
We will base out conclusion by calculating the measures of central tendency of the distribution i.e the mean, median, mode and range.
– Mean is the average of the numbers. It is the total sum of the numbers divided by the total number of students.
xbar = Sum Xi/N
Xi is the individual student score
SumXi = 63+66+70+81+81+92+92+93+94+94+95+95+95+96+97+98+98+99+100+100+100
SumXi = 1899
N = 21
xbar = 1899/21
xbar = 90.4
xbar ≈ 90
Hence the mean of the distribution is approximately equal to 90.
– Median is number at the middle of the dataset after rearrangement.
We need to locate the (N+1/2)the value of the dataset.
Given N =21
Median = (21+1)/2
Median = 22/2
Median = 11th
Thus means that the median value falls on the 11th number in the dataset.
Median value = 95.
Note that the data set has already been arranged in ascending order so no need of further rearrangement.
– Mode of the data is the value occurring the most in the data. The value with the highest frequency.
According to the data, it can be seen that the value that occur the most are 95 and 100 (They both occur 3times). Hence the modal value of the dataset are 95 and 100
– Range of the dataset will be the difference between the highest value and the lowest value in the dataset.
Highest score = 100
Lowest score = 63
Range = 100-63
Range = 37
can someone help me pls?
Answer:
decreasing: (-2, -1)∪(-1, 0)Step-by-step explanation:
From x = -2 to x = 0 function is decreasing, but for x= -1 function doesn't exist, so we need to exclude x = -1 from (-2, 0)
Which expression is equal to (2 – 5i) – (3 + 4i)?
O1 – 9i
0-1 – 9i
05 -
0 -1- i
Answer:
-1-9i (the second option)
Step-by-step explanation:
(2 – 5i) – (3 + 4i)
=2-5i-3-4i
= -1-9i
-1 – 9i this expression is equal to (2 – 5i) – (3 + 4i).
so, 2nd option is correct.
Here, we have,
To simplify the expression (2 – 5i) – (3 + 4i),
we need to perform the subtraction operation for both the real and imaginary parts separately.
The real part subtraction is done as follows: 2 - 3 = -1.
The imaginary part subtraction is done as follows: -5i - 4i = -9i.
Combining the real and imaginary parts, we get -1 - 9i.
Therefore, the expression (2 – 5i) – (3 + 4i) is equal to -1 - 9i.
Among the given options, the expression that matches this result is O-1 - 9i.
Hence, -1 – 9i this expression is equal to (2 – 5i) – (3 + 4i).
so, 2nd option is correct.
To learn more on subtraction click:
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