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Algebra Problems
13 Answers
Could someone please solve these algebra equations & give a brief explanation:
1) 5(m-2)-4(m+3)=0
2) 5(k+4)-3(k-6)=0
3) 4(y+7)-3(y+5)=0
4) 3(2x-4)-2(4x+5)=0
5) 4x+7=3x-7
6) y=4y+3
7) r=8+9r
8) w=5q-R
9) p=4m+8n
10) w+7=3w-1
My son is stuck with half of his homework & any help would be appreciated........Thanks
1) 5(m-2)-4(m+3)=0
2) 5(k+4)-3(k-6)=0
3) 4(y+7)-3(y+5)=0
4) 3(2x-4)-2(4x+5)=0
5) 4x+7=3x-7
6) y=4y+3
7) r=8+9r
8) w=5q-R
9) p=4m+8n
10) w+7=3w-1
My son is stuck with half of his homework & any help would be appreciated........Thanks
Answers
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For more on marking an answer as the "Best Answer", please visit our FAQ.The first few questions require the brackets to be expanded (multiplied out) and then 'like' terms collected before solving the equations
1) 5m - 10 - 4m - +12 = 0 so 1m - 22 = 0 , m =22
2) 5k + 20 - 3k - -18 = 0 so 2k + 38 = 0 , k = -19
3) 4y + 28 - 3y - +15 = 0 so 1y + 13 = 0, k = -13
4) 6x - 12 - 8x - +10 = 0 so -2x - 22 = 0, x = -11
The next few require the same operation to be carried out to each side of the equation as it is solved.
5) 4x+7=3x-7
(-3x) (-3x)
x + 7 = -7
(-7) (-7)
x = -14
6) y=4y+3 can be rewritten
4y + 3 = y
(-y) ( -y)
3y - 3 = 0
(+3) (=3)
4y = 3 , so y = 1
7) r=8+9r can be rewritten
9r + 8 = r
(-r) (-r)
8r + 8 = 0
(-8) (-8)
8r = -8, so r = -1
8) w=5q-R
9) p=4m+8n
cannot be solved as they srae stated as there is more than one unknown quantity in each question.
10) w+7=3w-1 can be rewritten
3w - 1 = w + 7
(-w) (-w)
2w - 1 = 7
(+1) (+1)
2w = 8, so w = 4
1) 5m - 10 - 4m - +12 = 0 so 1m - 22 = 0 , m =22
2) 5k + 20 - 3k - -18 = 0 so 2k + 38 = 0 , k = -19
3) 4y + 28 - 3y - +15 = 0 so 1y + 13 = 0, k = -13
4) 6x - 12 - 8x - +10 = 0 so -2x - 22 = 0, x = -11
The next few require the same operation to be carried out to each side of the equation as it is solved.
5) 4x+7=3x-7
(-3x) (-3x)
x + 7 = -7
(-7) (-7)
x = -14
6) y=4y+3 can be rewritten
4y + 3 = y
(-y) ( -y)
3y - 3 = 0
(+3) (=3)
4y = 3 , so y = 1
7) r=8+9r can be rewritten
9r + 8 = r
(-r) (-r)
8r + 8 = 0
(-8) (-8)
8r = -8, so r = -1
8) w=5q-R
9) p=4m+8n
cannot be solved as they srae stated as there is more than one unknown quantity in each question.
10) w+7=3w-1 can be rewritten
3w - 1 = w + 7
(-w) (-w)
2w - 1 = 7
(+1) (+1)
2w = 8, so w = 4
(2-part post):
Questions 8 and 9 don't have numerical answers and, as they stand, don't make any sense at all. (Question 8, for example could state "Rearrange the equation to make R the subject of the formula" but, without such a question or further information about the numeric values of two of the lettered terms, it's currently 'impossible').
Answers to the others (with explanations):
Q1. First get rid of the brackets by 'expanding' the terms. (i.e. multiply everything inside each bracket by what's outside of it). We then get:
5m - 10 - 4m -12 = 0
Now group the terms, thus:
m - 22 = 0
Add 22 to both sides (yo leave m on its own):
m = 22
Q2: Multiply out (as before):
5k + 20 -3k + 18 = 0
Group the terms:
2k + 38 = 0
Take 38 from both sides (to leave 2k on its own):
2k = -38
Divide everything by 2 (to leave k on its own):
k = -19
Questions 8 and 9 don't have numerical answers and, as they stand, don't make any sense at all. (Question 8, for example could state "Rearrange the equation to make R the subject of the formula" but, without such a question or further information about the numeric values of two of the lettered terms, it's currently 'impossible').
Answers to the others (with explanations):
Q1. First get rid of the brackets by 'expanding' the terms. (i.e. multiply everything inside each bracket by what's outside of it). We then get:
5m - 10 - 4m -12 = 0
Now group the terms, thus:
m - 22 = 0
Add 22 to both sides (yo leave m on its own):
m = 22
Q2: Multiply out (as before):
5k + 20 -3k + 18 = 0
Group the terms:
2k + 38 = 0
Take 38 from both sides (to leave 2k on its own):
2k = -38
Divide everything by 2 (to leave k on its own):
k = -19
Q3: Multiply out:
4y + 28 - 3y -15 = 0
Group the terms:
y + 13 = 0
Subtract 13 (to leave y on its own):
y = -13
Q4: Multiply out:
6x - 12 - 8x -10 = 0
Group the terms:
-2x -22 = 0
Add 22 to both sides (to leave -2x on its own):
-2x = 22
Divide by -2 (to leave x on its own):
x = -11
Q5: Subtract 3x from both sides (so that x only appears once in the equation):
x + 7 = -7
Subtract 7 from both sides (to leave x on its own):
x = -14
Q6: Subtract 4y from both sides (so that y only occurs once in the equation):
-3y = 3
Divide by -3 (to leave y on its own):
y = -1
Q7: Subtract 9r from both sides (so that r will only occur once in the equation):
-8r = 8
Divide by -8 (to leave r on its own):
r = -1
Q10: Subtract 3w from both sides (so that w only occurs once in the equation):
-2w + 7 = -1
Subtract 7 from both sides (to leave -2w on its own):
-2w = -8
Divide by -2 (to leave w on its own):
w = 4
Chris (a former maths teacher!)
4y + 28 - 3y -15 = 0
Group the terms:
y + 13 = 0
Subtract 13 (to leave y on its own):
y = -13
Q4: Multiply out:
6x - 12 - 8x -10 = 0
Group the terms:
-2x -22 = 0
Add 22 to both sides (to leave -2x on its own):
-2x = 22
Divide by -2 (to leave x on its own):
x = -11
Q5: Subtract 3x from both sides (so that x only appears once in the equation):
x + 7 = -7
Subtract 7 from both sides (to leave x on its own):
x = -14
Q6: Subtract 4y from both sides (so that y only occurs once in the equation):
-3y = 3
Divide by -3 (to leave y on its own):
y = -1
Q7: Subtract 9r from both sides (so that r will only occur once in the equation):
-8r = 8
Divide by -8 (to leave r on its own):
r = -1
Q10: Subtract 3w from both sides (so that w only occurs once in the equation):
-2w + 7 = -1
Subtract 7 from both sides (to leave -2w on its own):
-2w = -8
Divide by -2 (to leave w on its own):
w = 4
Chris (a former maths teacher!)