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Mathematics : asked on rnv9d937
 04.05.2021

What is the simplified form of the quantity of x plus 7, all over 2 − the quantity of x plus 4, all over 2?

the quantity of 3 over 2
the quantity of x plus 3, all over 2
the quantity of x minus 3, all over 2
the quantity of 2x plus 11, all over the quantity 2

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30.05.2023, solved by verified expert
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Ranjana Bhatt
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(x + 7)/2 - (x + 4)/2 = (x + 7 - (x + 4)/2 = (x + 7 - x - 4)/2 = 3/2
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Bhaskar Singh Bora
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we know that the expression is equal to

What is the simplified form of the quantity of, №16479269, 04.05.2021 22:50

Subtract the two fractions

What is the simplified form of the quantity of, №16479269, 04.05.2021 22:50

therefore

the answer is

the quantity of What is the simplified form of the quantity of, №16479269, 04.05.2021 22:50 over What is the simplified form of the quantity of, №16479269, 04.05.2021 22:50

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Faq

Mathematics
What is the simplified form of the quantity of x plus 7, all over 2 − the quantity of x plus 4, all over 2? the quantity of 3 over 2 the quantity of x plus 3, all over 2 the quantity of x minus 3, all over 2 the quantity of 2x plus 11, all over the quantity 2
Step-by-step answer
P Answered by PhD
(x + 7)/2 - (x + 4)/2 = (x + 7 - (x + 4)/2 = (x + 7 - x - 4)/2 = 3/2
Mathematics
What is the simplified form of the quantity of x plus 4, all over the quantity of 7 − the quantity of x plus 3, all over the quantity of x plus 5? (2 points) the quantity of x squared plus 2x minus 1, all over 7 times the quantity of x plus 5 the quantity of x squared plus 16x plus 41, all over 7 times the quantity of x plus 5 the quantity of x plus 1, all over the quantity of 2 minus x the quantity of 1, all over the quantity of 2 minus x
Step-by-step answer
P Answered by Specialist

A is correct.

The quantity of x squared plus 2x minus 1, all over 7 times the quantity and plus 5.

Explanation:

quantity of x plus 4, all over the quantity of 7 − the quantity of x plus 3, all over the quantity of x plus 5

First we write this into rational expression

\frac{x+4}{7}-\frac{x+3}{x+5}

Now we find the LCD of 7 and x+5, i.e 7(x+5)

\frac{(x+4)(x+5)-7(x+3)}{7(x+5)}

\frac{x^2+9x+20-7x-21}{7x+35)}

\frac{x^2+2x-1}{7x+35)}

Now we write the simplified expression into sentence form.

The quantity of x squared plus 2x minus 1, all over 7 times the quantity and plus 5.

Mathematics
What is the simplified form of the quantity of x plus 4, all over the quantity of 7 − the quantity of x plus 3, all over the quantity of x plus 5? (2 points) the quantity of x squared plus 2x minus 1, all over 7 times the quantity of x plus 5 the quantity of x squared plus 16x plus 41, all over 7 times the quantity of x plus 5 the quantity of x plus 1, all over the quantity of 2 minus x the quantity of 1, all over the quantity of 2 minus x
Step-by-step answer
P Answered by Specialist

A is correct.

The quantity of x squared plus 2x minus 1, all over 7 times the quantity and plus 5.

Explanation:

quantity of x plus 4, all over the quantity of 7 − the quantity of x plus 3, all over the quantity of x plus 5

First we write this into rational expression

\frac{x+4}{7}-\frac{x+3}{x+5}

Now we find the LCD of 7 and x+5, i.e 7(x+5)

\frac{(x+4)(x+5)-7(x+3)}{7(x+5)}

\frac{x^2+9x+20-7x-21}{7x+35)}

\frac{x^2+2x-1}{7x+35)}

Now we write the simplified expression into sentence form.

The quantity of x squared plus 2x minus 1, all over 7 times the quantity and plus 5.

Mathematics
Question 1 solve for x using the quadratic formula: x2 − 6x + 9 = 0 x equals negative b plus or minus the square root of b squared minus 4 times a times c, all over 2 times a x = 6 x = 3 x = 1 x = 0 question 2 solve: 49x2 − 60 = 0 round your answer to the nearest hundredth. x = 0 x = −3.32 and x = 3.32 x = −1.11 and x = 1.11 x = −0.82 and x = 0.82 question 3 when the solution of x2 − 9x − 6 is expressed as 9 plus or minus the square root of r, all over 2, what is the value of r? x equals negative b plus or minus the square root of b squared minus
Step-by-step answer
P Answered by Master

Part 1) x=3

Part 2) x = −1.11 and x = 1.11

Part 3) 105

Part 4) a = −6, b = 9, c = −7

Part 5) x equals 5 plus or minus the square root of 33, all over 2

Part 6) In the procedure

Part 7) -0.55

Part 8) The denominator is 2

Part 9) a = −6, b = −8, c = 12

Step-by-step explanation:

we know that

The formula to solve a quadratic equation of the form ax^{2} +bx+c=0 is equal to

x=\frac{-b(+/-)\sqrt{b^{2}-4ac}} {2a}

Part 1)

in this problem we have

x^{2} -6x+9=0  

so

a=1\\b=-6\\c=9

substitute in the formula

x=\frac{-(-6)(+/-)\sqrt{-6^{2}-4(1)(9)}} {2(1)}

x=\frac{6(+/-)\sqrt{0}} {2}

x=\frac{6} {2}=3

Part 2) in this problem we have

49x^{2} -60=0  

so

a=49\\b=0\\c=-60

substitute in the formula

x=\frac{0(+/-)\sqrt{0^{2}-4(49)(-60)}} {2(49)}

x=\frac{0(+/-)\sqrt{11,760}} {98}

x=(+/-)1.11

Part 3) When the solution of x2 − 9x − 6 is expressed as 9 plus or minus the square root of r, all over 2, what is the value of r?

in this problem we have

x^{2} -9x-6=0  

so

a=1\\b=-9\\c=-6

substitute in the formula

x=\frac{-(-9)(+/-)\sqrt{-9^{2}-4(1)(-6)}} {2(1)}

x=\frac{9(+/-)\sqrt{105}} {2}

therefore

r=105

Part 4) What are the values a, b, and c in the following quadratic equation?

−6x2 = −9x + 7

in this problem we have

-6x^{2}=-9x+7  

-6x^{2}+9x-7=0  

so

a=-6\\b=9\\c=-7

Part 5) Use the quadratic formula to find the exact solutions of x2 − 5x − 2 = 0.

In this problem we have  

x^{2} -5x-2=0  

so

a=1\\b=-5\\c=-2

substitute in the formula

x=\frac{-(-5)(+/-)\sqrt{-5^{2}-4(1)(-2)}} {2(1)}

x=\frac{5(+/-)\sqrt{33}} {2}

therefore  

x equals 5 plus or minus the square root of 33, all over 2

Part 6) Quadratic Formula proof

we have

ax^{2} +bx+c=0  

Divide both sides by a

x^{2} +(b/a)x+(c/a)=0  

Complete the square

x^{2} +(b/a)x=-(c/a)  

x^{2} +\frac{b}{a}x+\frac{b^{2}}{4a^{2}} =-\frac{c}{a}+\frac{b^{2}}{4a^{2}}

Rewrite the perfect square trinomial on the left side of the equation as a binomial squared

(x+\frac{b}{2a})^{2}=-\frac{4ac}{a^{2}}+\frac{b^{2}}{4a^{2}}

Find a common denominator on the right side of the equation

(x+\frac{b}{2a})^{2}=\frac{b^{2}-4ac}{4a^{2}}

Take the square root of both sides of the equation

(x+\frac{b}{2a})=(+/-)\sqrt{\frac{b^{2}-4ac}{4a^{2}}}

Simplify the right side of the equation

(x+\frac{b}{2a})=(+/-)\frac{\sqrt{b^{2}-4ac}}{2a}

Subtract the quantity b over 2 times a from both sides of the equation

x=-\frac{b}{2a}(+/-)\frac{\sqrt{b^{2}-4ac}}{2a}

x=\frac{-b(+/-)\sqrt{b^{2}-4ac}} {2a}

Part 7) in this problem we have  

3x^{2} +45x+24=0  

so

a=3\\b=45\\c=24

substitute in the formula

x=\frac{-(45)(+/-)\sqrt{45^{2}-4(3)(24)}} {2(3)}

x=\frac{-(45)(+/-)\sqrt{1,737}} {6}

x1=\frac{-(45)(+)\sqrt{1,737}} {6}=-0.55

x2=\frac{-(45)(-)\sqrt{1,737}} {6}=-14.45

therefore

The other solution is

-0.55

Part 8) in this problem we have

2x^{2} -8x+7=0  

so

a=2\\b=-8\\c=7

substitute in the formula

x=\frac{-(-8)(+/-)\sqrt{-8^{2}-4(2)(7)}} {2(2)}

x=\frac{8(+/-)\sqrt{8}} {4}

x=\frac{8(+/-)2\sqrt{2}} {4}

x=\frac{4(+/-)\sqrt{2}} {2}

therefore

The denominator is 2

Part 9) What are the values a, b, and c in the following quadratic equation?

−6x2 − 8x + 12

in this problem we have

-6x^{2} -8x+12=0  

so

a=-6\\b=-8\\c=12

Mathematics
You can buy jars of the same jam in 2 sizes large jar:440g for £1.54 small jar:340g for £1.26 By considering the price per gram, work out which jar is the best value for money. Working must be shown
Step-by-step answer
P Answered by PhD
Answer: 440 grams for 1.54 is the better value
Explanation:
Take the price and divide by the number of grams
1.54 / 440 =0.0035 per gram
1.26 / 340 =0.003705882 per gram
0.0035 per gram < 0.003705882 per gram
Mathematics
The last time Robert filled up his car with gas, he paid $24.50 for 7 gallons. This time, he needs 15 gallons. If the price is the same, how much will he pay?
Step-by-step answer
P Answered by PhD

Cost of 7 gallons=$24.50

Cost of 1 gallon=24.50/7=3.5

Cost of 15 gallons=15*3.5=52.5

Cost of 15 gallons will be $52.5

Mathematics
An online media service offers video and music downloads. Each download of a song costs $1. Each download of a video costs 5 times as much as the song download. You have a credit of $70. How many songs can you purchase after buying 12 videos?
Step-by-step answer
P Answered by PhD

The answer is in the image 

The answer is in the image 
Mathematics
Use the X method to find the solutions of6x2 + 2x – 20 = 0.
Step-by-step answer
P Answered by PhD
The answer is in the image 

The answer is in the image 

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A 4300-N force from a car s engines produces an acceleration of 3.3 m/s2. What is the mass of the car? A. 4300 kg B. 1300 kg C. 14,000 kg D. 390 kg
Step-by-step answer
P Answered by PhD

F=ma

where F=force

m=mass

a=acceleration

Here,

F=4300

a=3.3m/s2

m=F/a

    =4300/3.3

    =1303.03kg

Mathematics
Which number is the smallest? 4.4 ⋅ 10−5, 3.99 ⋅ 10−6, 2.6 ⋅ 102, 1.85 ⋅ 103
Step-by-step answer
P Answered by PhD

The answer is in the image 

The answer is in the image 
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