Skip to main content
Editing a short answer - math & science question by WIRIS
You have permission to :
Edit this question
General
Category
Default for System (16649)
Test-Lidia
Question name
Question text
<p><strong>Considere los dos triangulos formados sobre el ángulo b (ángulo que es delimitado a y c) <br></strong></p> <p><img alt="" src="data:image/jpeg;base64,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" width="236" height="122"> </p> <p><span style="color: #000080;"><strong>Si </strong></span>«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#00007F¨»1«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»,«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#00007F¨»1«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»,«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»`«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#00007F¨»2«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold-italic¨ mathcolor=¨#00007F¨»y«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»`«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#00007F¨»2«/mn»«/mstyle»«/math», </p> <p><strong><span style="color: #000080;">a)¿A Que fracción simplificada corresponde el «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»sin«/mi»«mfenced»«mi»§#946;«/mi»«/mfenced»«/math» formado por el triangulo pequeño (en color azul)?</span></strong></p> <p><strong><span style="color: #000080;">b) ¿A que fraccion simplificada corresponde el «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»sin«/mi»«mfenced»«mi»§#946;«/mi»«/mfenced»«/math» formado por el triangulo mayor (en color rojo)?</span></strong></p> <p><strong><span style="color: #000080;">c) ¿En general, el valor del seno depende del ángulo (responda con un 1) o de la medida del triangulo (responda con un 2)?</span></strong></p> <p> </p>
Default mark
General feedback
No, case is unimportant
Yes, case must match
Correct answers
You must provide at least one possible answer. The first matching answer will be used to determine the score and feedback. Click the icon next to the answer field to edit the mathematical properties of the answer and the question.
Answer 1
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
Answer 2
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
Settings for multiple tries
Penalty for each incorrect try
100%
50%
33.33333%
25%
20%
10%
0%
Hint 1
Hint text
<p><span style="color: #003300;" data-mce-mark="1"><strong>En el triangle petit, «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mi mathvariant=¨bold¨ mathcolor=¨#007F00¨»sinB«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#007F00¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#007F00¨»=«/mo»«mfrac mathcolor=¨#007F00¨»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»b«/mi»«mn mathvariant=¨bold¨»1«/mn»«/mrow»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»a«/mi»«mn mathvariant=¨bold¨»1«/mn»«/mrow»«/mfrac»«/mrow»«/mstyle»«/math»</strong></span></p> <p><span style="color: #003300;" data-mce-mark="1"><strong>En el triangle gran, «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mi mathvariant=¨bold¨ mathcolor=¨#007F00¨»sinB«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#007F00¨»=«/mo»«mfrac mathcolor=¨#007F00¨»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»b«/mi»«mn mathvariant=¨bold¨»2«/mn»«/mrow»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»a«/mi»«mn mathvariant=¨bold¨»2«/mn»«/mrow»«/mfrac»«/mrow»«/mstyle»«/math»</strong></span></p> <p><span style="color: #003300;"><strong>És fàcil comparar les fraccions <span style="text-decoration: underline;"><span style="font-size: medium;">simplificades</span></span> per respondre!</strong></span></p>
Hint 2
Hint text
Created / last saved
Created
by
Admin User
on
Wednesday, 15 February 2017, 3:40 PM
Last saved
by
Admin User
on
Wednesday, 15 February 2017, 3:40 PM
There are required fields in this form marked
.