If a 12 by 16 sheet of paper is folded on its diagonal, what is the area of the region of the overlap?
$begingroup$
I have tried this problem and keep on getting 96 as my answer, where the correct answer is 75.
Problem:
If a 12 by 16 sheet of paper is folded on its diagonal, what is the area of the region of the overlap (the region where paper is on top of paper)?
geometry
New contributor
$endgroup$
add a comment |
$begingroup$
I have tried this problem and keep on getting 96 as my answer, where the correct answer is 75.
Problem:
If a 12 by 16 sheet of paper is folded on its diagonal, what is the area of the region of the overlap (the region where paper is on top of paper)?
geometry
New contributor
$endgroup$
$begingroup$
I either don't understand the question, or the answer is 96.
$endgroup$
– Floris Claassens
4 hours ago
$begingroup$
@FlorisClaassens I get 75. How do you two get $96$? If we compare work we can maybe see where one (or both) of us are making the error.
$endgroup$
– fleablood
4 hours ago
$begingroup$
The answer can't be $96$. An oblong rectangle won't fold evenly onto itself so the overlapping area must be less than one half the area of the rectangle. $96$ is exactly equal to half the area so $96$ is an impossible answer.
$endgroup$
– fleablood
4 hours ago
add a comment |
$begingroup$
I have tried this problem and keep on getting 96 as my answer, where the correct answer is 75.
Problem:
If a 12 by 16 sheet of paper is folded on its diagonal, what is the area of the region of the overlap (the region where paper is on top of paper)?
geometry
New contributor
$endgroup$
I have tried this problem and keep on getting 96 as my answer, where the correct answer is 75.
Problem:
If a 12 by 16 sheet of paper is folded on its diagonal, what is the area of the region of the overlap (the region where paper is on top of paper)?
geometry
geometry
New contributor
New contributor
edited 4 hours ago
Blue
48.6k870154
48.6k870154
New contributor
asked 4 hours ago
NJCNJC
161
161
New contributor
New contributor
$begingroup$
I either don't understand the question, or the answer is 96.
$endgroup$
– Floris Claassens
4 hours ago
$begingroup$
@FlorisClaassens I get 75. How do you two get $96$? If we compare work we can maybe see where one (or both) of us are making the error.
$endgroup$
– fleablood
4 hours ago
$begingroup$
The answer can't be $96$. An oblong rectangle won't fold evenly onto itself so the overlapping area must be less than one half the area of the rectangle. $96$ is exactly equal to half the area so $96$ is an impossible answer.
$endgroup$
– fleablood
4 hours ago
add a comment |
$begingroup$
I either don't understand the question, or the answer is 96.
$endgroup$
– Floris Claassens
4 hours ago
$begingroup$
@FlorisClaassens I get 75. How do you two get $96$? If we compare work we can maybe see where one (or both) of us are making the error.
$endgroup$
– fleablood
4 hours ago
$begingroup$
The answer can't be $96$. An oblong rectangle won't fold evenly onto itself so the overlapping area must be less than one half the area of the rectangle. $96$ is exactly equal to half the area so $96$ is an impossible answer.
$endgroup$
– fleablood
4 hours ago
$begingroup$
I either don't understand the question, or the answer is 96.
$endgroup$
– Floris Claassens
4 hours ago
$begingroup$
I either don't understand the question, or the answer is 96.
$endgroup$
– Floris Claassens
4 hours ago
$begingroup$
@FlorisClaassens I get 75. How do you two get $96$? If we compare work we can maybe see where one (or both) of us are making the error.
$endgroup$
– fleablood
4 hours ago
$begingroup$
@FlorisClaassens I get 75. How do you two get $96$? If we compare work we can maybe see where one (or both) of us are making the error.
$endgroup$
– fleablood
4 hours ago
$begingroup$
The answer can't be $96$. An oblong rectangle won't fold evenly onto itself so the overlapping area must be less than one half the area of the rectangle. $96$ is exactly equal to half the area so $96$ is an impossible answer.
$endgroup$
– fleablood
4 hours ago
$begingroup$
The answer can't be $96$. An oblong rectangle won't fold evenly onto itself so the overlapping area must be less than one half the area of the rectangle. $96$ is exactly equal to half the area so $96$ is an impossible answer.
$endgroup$
– fleablood
4 hours ago
add a comment |
6 Answers
6
active
oldest
votes
$begingroup$
The overlapping region is triangle $AEC$, with base $AC=20$ and altitude $EH$. To find $EH$, observe that $GH=BF=48/5$ and $DB'=AC-2CF=28/5$. By similitude one then gets $EH=15/2$.
$endgroup$
$begingroup$
What tools do you use to sketch the picture? I have been trying to find a fast sketching tool to generate good pictures to answer geometric questions.
$endgroup$
– Jacky Chong
4 hours ago
add a comment |
$begingroup$
The overlap is not exactly half the piece of paper, try folding a piece of paper along the diagonal and you'll see why. I can confirm the answer is indeed 75.
$endgroup$
add a comment |
$begingroup$
The area is (1/2)(20)(120/16) = 75 which is half the base times the hight. The hight is found by similar triangles.
$endgroup$
add a comment |
$begingroup$
The diagonal is $20$ inches long. (Pythagorean Theorem).
The angles well be $A= arcsin frac {12}{20}=arccos frac {16}{20}$ and $B= arcsin frac {16}{20}=arccos frac {12}{20}$ with $A < B$ and $A + B = 90^circ$. (Basic trig definitions. Draw a picture to verify.)
The resulting shape will be an isosceles triangle with a base of $20$ and two base angles of $A$. This cuts in half into two congruent right triangles.
The proportions of one of these right triangles is Hypotenuse = $h$. Base = $h*cos A= h*cosarccos frac {16}{20} = h*frac 45 = 10$. And height will = $h*sin A=hsin arcsin frac {12}{20} = h*frac 35$.
$h* frac 45 = 10$ so $h = 12.5$ and so the height is $12.5*frac 35 = 7.5$.
And the area of the triangle is $frac 12*20*7.5 = 75$.
$endgroup$
add a comment |
$begingroup$
Folding the piece of paper, you get an isosceles triangle with 2 congruent right triangles on its sides. Each of these right triangles has side lengths $a, 12, h$, where $a$ is the shortest side and $h$ is the hypotenuse. Using the pythagorean theorem, and the fact that $a+h=16$, you get two equations in two variables, the other one being $h^2-a^2=(h-a)(h+a)=144$. This says that $h-a=9$, and so $h=12.5$ and $a=3.5$. The area of the overlap is the area of a 12x16 triangle minus a 3.5x12 triangle, which is in fact 75.
$endgroup$
add a comment |
$begingroup$
Referring to the Diagram from Aretino
By the Pythagorean theorem the diagonal [AC] is 20 inches.
Therefore 1/2 the diagonal [AH] is 10 inches.
By similar triangles: [AEH] is similar to [ACB].
$$frac{EH}{AH} = frac{BC}{AB} Rightarrow frac {h} {10} = frac {12}{16} $$
Solve for height
$$h=frac{120}{16}=7.5$$
Solve for area of triangle [AEC]
$$Area=frac 1 2 cdot Base cdot Height Rightarrow frac 1 2 cdot AC cdot EH Rightarrow frac 12 cdot 20 cdot 7.5 = 75 $$
New contributor
$endgroup$
add a comment |
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6 Answers
6
active
oldest
votes
6 Answers
6
active
oldest
votes
active
oldest
votes
active
oldest
votes
$begingroup$
The overlapping region is triangle $AEC$, with base $AC=20$ and altitude $EH$. To find $EH$, observe that $GH=BF=48/5$ and $DB'=AC-2CF=28/5$. By similitude one then gets $EH=15/2$.
$endgroup$
$begingroup$
What tools do you use to sketch the picture? I have been trying to find a fast sketching tool to generate good pictures to answer geometric questions.
$endgroup$
– Jacky Chong
4 hours ago
add a comment |
$begingroup$
The overlapping region is triangle $AEC$, with base $AC=20$ and altitude $EH$. To find $EH$, observe that $GH=BF=48/5$ and $DB'=AC-2CF=28/5$. By similitude one then gets $EH=15/2$.
$endgroup$
$begingroup$
What tools do you use to sketch the picture? I have been trying to find a fast sketching tool to generate good pictures to answer geometric questions.
$endgroup$
– Jacky Chong
4 hours ago
add a comment |
$begingroup$
The overlapping region is triangle $AEC$, with base $AC=20$ and altitude $EH$. To find $EH$, observe that $GH=BF=48/5$ and $DB'=AC-2CF=28/5$. By similitude one then gets $EH=15/2$.
$endgroup$
The overlapping region is triangle $AEC$, with base $AC=20$ and altitude $EH$. To find $EH$, observe that $GH=BF=48/5$ and $DB'=AC-2CF=28/5$. By similitude one then gets $EH=15/2$.
answered 4 hours ago
AretinoAretino
24k21443
24k21443
$begingroup$
What tools do you use to sketch the picture? I have been trying to find a fast sketching tool to generate good pictures to answer geometric questions.
$endgroup$
– Jacky Chong
4 hours ago
add a comment |
$begingroup$
What tools do you use to sketch the picture? I have been trying to find a fast sketching tool to generate good pictures to answer geometric questions.
$endgroup$
– Jacky Chong
4 hours ago
$begingroup$
What tools do you use to sketch the picture? I have been trying to find a fast sketching tool to generate good pictures to answer geometric questions.
$endgroup$
– Jacky Chong
4 hours ago
$begingroup$
What tools do you use to sketch the picture? I have been trying to find a fast sketching tool to generate good pictures to answer geometric questions.
$endgroup$
– Jacky Chong
4 hours ago
add a comment |
$begingroup$
The overlap is not exactly half the piece of paper, try folding a piece of paper along the diagonal and you'll see why. I can confirm the answer is indeed 75.
$endgroup$
add a comment |
$begingroup$
The overlap is not exactly half the piece of paper, try folding a piece of paper along the diagonal and you'll see why. I can confirm the answer is indeed 75.
$endgroup$
add a comment |
$begingroup$
The overlap is not exactly half the piece of paper, try folding a piece of paper along the diagonal and you'll see why. I can confirm the answer is indeed 75.
$endgroup$
The overlap is not exactly half the piece of paper, try folding a piece of paper along the diagonal and you'll see why. I can confirm the answer is indeed 75.
answered 4 hours ago
bitesizebobitesizebo
1,50618
1,50618
add a comment |
add a comment |
$begingroup$
The area is (1/2)(20)(120/16) = 75 which is half the base times the hight. The hight is found by similar triangles.
$endgroup$
add a comment |
$begingroup$
The area is (1/2)(20)(120/16) = 75 which is half the base times the hight. The hight is found by similar triangles.
$endgroup$
add a comment |
$begingroup$
The area is (1/2)(20)(120/16) = 75 which is half the base times the hight. The hight is found by similar triangles.
$endgroup$
The area is (1/2)(20)(120/16) = 75 which is half the base times the hight. The hight is found by similar triangles.
answered 4 hours ago
Mohammad Riazi-KermaniMohammad Riazi-Kermani
41.6k42061
41.6k42061
add a comment |
add a comment |
$begingroup$
The diagonal is $20$ inches long. (Pythagorean Theorem).
The angles well be $A= arcsin frac {12}{20}=arccos frac {16}{20}$ and $B= arcsin frac {16}{20}=arccos frac {12}{20}$ with $A < B$ and $A + B = 90^circ$. (Basic trig definitions. Draw a picture to verify.)
The resulting shape will be an isosceles triangle with a base of $20$ and two base angles of $A$. This cuts in half into two congruent right triangles.
The proportions of one of these right triangles is Hypotenuse = $h$. Base = $h*cos A= h*cosarccos frac {16}{20} = h*frac 45 = 10$. And height will = $h*sin A=hsin arcsin frac {12}{20} = h*frac 35$.
$h* frac 45 = 10$ so $h = 12.5$ and so the height is $12.5*frac 35 = 7.5$.
And the area of the triangle is $frac 12*20*7.5 = 75$.
$endgroup$
add a comment |
$begingroup$
The diagonal is $20$ inches long. (Pythagorean Theorem).
The angles well be $A= arcsin frac {12}{20}=arccos frac {16}{20}$ and $B= arcsin frac {16}{20}=arccos frac {12}{20}$ with $A < B$ and $A + B = 90^circ$. (Basic trig definitions. Draw a picture to verify.)
The resulting shape will be an isosceles triangle with a base of $20$ and two base angles of $A$. This cuts in half into two congruent right triangles.
The proportions of one of these right triangles is Hypotenuse = $h$. Base = $h*cos A= h*cosarccos frac {16}{20} = h*frac 45 = 10$. And height will = $h*sin A=hsin arcsin frac {12}{20} = h*frac 35$.
$h* frac 45 = 10$ so $h = 12.5$ and so the height is $12.5*frac 35 = 7.5$.
And the area of the triangle is $frac 12*20*7.5 = 75$.
$endgroup$
add a comment |
$begingroup$
The diagonal is $20$ inches long. (Pythagorean Theorem).
The angles well be $A= arcsin frac {12}{20}=arccos frac {16}{20}$ and $B= arcsin frac {16}{20}=arccos frac {12}{20}$ with $A < B$ and $A + B = 90^circ$. (Basic trig definitions. Draw a picture to verify.)
The resulting shape will be an isosceles triangle with a base of $20$ and two base angles of $A$. This cuts in half into two congruent right triangles.
The proportions of one of these right triangles is Hypotenuse = $h$. Base = $h*cos A= h*cosarccos frac {16}{20} = h*frac 45 = 10$. And height will = $h*sin A=hsin arcsin frac {12}{20} = h*frac 35$.
$h* frac 45 = 10$ so $h = 12.5$ and so the height is $12.5*frac 35 = 7.5$.
And the area of the triangle is $frac 12*20*7.5 = 75$.
$endgroup$
The diagonal is $20$ inches long. (Pythagorean Theorem).
The angles well be $A= arcsin frac {12}{20}=arccos frac {16}{20}$ and $B= arcsin frac {16}{20}=arccos frac {12}{20}$ with $A < B$ and $A + B = 90^circ$. (Basic trig definitions. Draw a picture to verify.)
The resulting shape will be an isosceles triangle with a base of $20$ and two base angles of $A$. This cuts in half into two congruent right triangles.
The proportions of one of these right triangles is Hypotenuse = $h$. Base = $h*cos A= h*cosarccos frac {16}{20} = h*frac 45 = 10$. And height will = $h*sin A=hsin arcsin frac {12}{20} = h*frac 35$.
$h* frac 45 = 10$ so $h = 12.5$ and so the height is $12.5*frac 35 = 7.5$.
And the area of the triangle is $frac 12*20*7.5 = 75$.
edited 3 hours ago
answered 4 hours ago
fleabloodfleablood
71.4k22686
71.4k22686
add a comment |
add a comment |
$begingroup$
Folding the piece of paper, you get an isosceles triangle with 2 congruent right triangles on its sides. Each of these right triangles has side lengths $a, 12, h$, where $a$ is the shortest side and $h$ is the hypotenuse. Using the pythagorean theorem, and the fact that $a+h=16$, you get two equations in two variables, the other one being $h^2-a^2=(h-a)(h+a)=144$. This says that $h-a=9$, and so $h=12.5$ and $a=3.5$. The area of the overlap is the area of a 12x16 triangle minus a 3.5x12 triangle, which is in fact 75.
$endgroup$
add a comment |
$begingroup$
Folding the piece of paper, you get an isosceles triangle with 2 congruent right triangles on its sides. Each of these right triangles has side lengths $a, 12, h$, where $a$ is the shortest side and $h$ is the hypotenuse. Using the pythagorean theorem, and the fact that $a+h=16$, you get two equations in two variables, the other one being $h^2-a^2=(h-a)(h+a)=144$. This says that $h-a=9$, and so $h=12.5$ and $a=3.5$. The area of the overlap is the area of a 12x16 triangle minus a 3.5x12 triangle, which is in fact 75.
$endgroup$
add a comment |
$begingroup$
Folding the piece of paper, you get an isosceles triangle with 2 congruent right triangles on its sides. Each of these right triangles has side lengths $a, 12, h$, where $a$ is the shortest side and $h$ is the hypotenuse. Using the pythagorean theorem, and the fact that $a+h=16$, you get two equations in two variables, the other one being $h^2-a^2=(h-a)(h+a)=144$. This says that $h-a=9$, and so $h=12.5$ and $a=3.5$. The area of the overlap is the area of a 12x16 triangle minus a 3.5x12 triangle, which is in fact 75.
$endgroup$
Folding the piece of paper, you get an isosceles triangle with 2 congruent right triangles on its sides. Each of these right triangles has side lengths $a, 12, h$, where $a$ is the shortest side and $h$ is the hypotenuse. Using the pythagorean theorem, and the fact that $a+h=16$, you get two equations in two variables, the other one being $h^2-a^2=(h-a)(h+a)=144$. This says that $h-a=9$, and so $h=12.5$ and $a=3.5$. The area of the overlap is the area of a 12x16 triangle minus a 3.5x12 triangle, which is in fact 75.
answered 3 hours ago
D.R.D.R.
1,467721
1,467721
add a comment |
add a comment |
$begingroup$
Referring to the Diagram from Aretino
By the Pythagorean theorem the diagonal [AC] is 20 inches.
Therefore 1/2 the diagonal [AH] is 10 inches.
By similar triangles: [AEH] is similar to [ACB].
$$frac{EH}{AH} = frac{BC}{AB} Rightarrow frac {h} {10} = frac {12}{16} $$
Solve for height
$$h=frac{120}{16}=7.5$$
Solve for area of triangle [AEC]
$$Area=frac 1 2 cdot Base cdot Height Rightarrow frac 1 2 cdot AC cdot EH Rightarrow frac 12 cdot 20 cdot 7.5 = 75 $$
New contributor
$endgroup$
add a comment |
$begingroup$
Referring to the Diagram from Aretino
By the Pythagorean theorem the diagonal [AC] is 20 inches.
Therefore 1/2 the diagonal [AH] is 10 inches.
By similar triangles: [AEH] is similar to [ACB].
$$frac{EH}{AH} = frac{BC}{AB} Rightarrow frac {h} {10} = frac {12}{16} $$
Solve for height
$$h=frac{120}{16}=7.5$$
Solve for area of triangle [AEC]
$$Area=frac 1 2 cdot Base cdot Height Rightarrow frac 1 2 cdot AC cdot EH Rightarrow frac 12 cdot 20 cdot 7.5 = 75 $$
New contributor
$endgroup$
add a comment |
$begingroup$
Referring to the Diagram from Aretino
By the Pythagorean theorem the diagonal [AC] is 20 inches.
Therefore 1/2 the diagonal [AH] is 10 inches.
By similar triangles: [AEH] is similar to [ACB].
$$frac{EH}{AH} = frac{BC}{AB} Rightarrow frac {h} {10} = frac {12}{16} $$
Solve for height
$$h=frac{120}{16}=7.5$$
Solve for area of triangle [AEC]
$$Area=frac 1 2 cdot Base cdot Height Rightarrow frac 1 2 cdot AC cdot EH Rightarrow frac 12 cdot 20 cdot 7.5 = 75 $$
New contributor
$endgroup$
Referring to the Diagram from Aretino
By the Pythagorean theorem the diagonal [AC] is 20 inches.
Therefore 1/2 the diagonal [AH] is 10 inches.
By similar triangles: [AEH] is similar to [ACB].
$$frac{EH}{AH} = frac{BC}{AB} Rightarrow frac {h} {10} = frac {12}{16} $$
Solve for height
$$h=frac{120}{16}=7.5$$
Solve for area of triangle [AEC]
$$Area=frac 1 2 cdot Base cdot Height Rightarrow frac 1 2 cdot AC cdot EH Rightarrow frac 12 cdot 20 cdot 7.5 = 75 $$
New contributor
New contributor
answered 1 hour ago
CRawsonCRawson
11
11
New contributor
New contributor
add a comment |
add a comment |
NJC is a new contributor. Be nice, and check out our Code of Conduct.
NJC is a new contributor. Be nice, and check out our Code of Conduct.
NJC is a new contributor. Be nice, and check out our Code of Conduct.
NJC is a new contributor. Be nice, and check out our Code of Conduct.
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$begingroup$
I either don't understand the question, or the answer is 96.
$endgroup$
– Floris Claassens
4 hours ago
$begingroup$
@FlorisClaassens I get 75. How do you two get $96$? If we compare work we can maybe see where one (or both) of us are making the error.
$endgroup$
– fleablood
4 hours ago
$begingroup$
The answer can't be $96$. An oblong rectangle won't fold evenly onto itself so the overlapping area must be less than one half the area of the rectangle. $96$ is exactly equal to half the area so $96$ is an impossible answer.
$endgroup$
– fleablood
4 hours ago