Home
Ask Question?
Business Account
Exam
Exam List
Exam Result
Category
1-12 Class
Board Exam
Admission
Job Solution
Skill Development
Book Collection
Video Content
Blog Content
Question
Ask Question?
Current Affairs
All MCQ Question
All Written Question
Upload Question
General
Study Plan
Hand Note
Notice | News
Other
FAQ
Point
Package
Feedback
Home
Academy
Admission
Job Assistant
Current Affairs
Skill
Forum
Blog
Package
Unauthenticate
Guest
example@gmail.com
Login
Description
Home
Edit Description
Back
Edit Description
Fill up the form and submit
Question
Two men, starting at the same point, walk in opposite directions for 4 meters, turn left and walk another 3 meters. What is the distance between them?
7 meters
14 meters
10 meters
6 meters
ANSWER : 3
Descrption
<p><img class="image_resized" style="width:37.86%;" src="data:image/jpeg;base64,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"></p><p>QZ=?</p><p>let , XQ = x<br>tringle XRQ,<br>x<sup>2</sup> = 4<sup>2</sup> + 3<sup>2</sup></p><p>x = 5<br>QZ = 2 * XQ<br>QZ = 2 * 5<br> = 10</p>
Please, login first.
click here to login
Cancel
Login
©2024 SATT ACADEMY. All rights reserved.