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Cuemath Online: A Live Interactive Math Class for Students

The online mode of learning is one of the most popular modes of education nowadays. Various learning management institutions are offering online learning opportunities for students and professionals. The Cuemath online learning management platform provides valuable guidance to students in understanding basic concepts in mathematics and coding. Learning mathematics may be a challenge, especially for young students.
So, Cuemath online applies the approach of applying easy and simple methods of learning that focus on the overall development of problem-solving skills and analytical abilities in students. It focuses on practice-oriented learning, which is essential for mathematics learning. The objective is to make students ready to handle any type of assignment involving complex mathematical problems.

What are Learning Platforms?

Mathematics topics include various branches and several concepts that are interlinked. Cuemath teaches some of the most important concepts in mathematics, including arithmetic, algebra, trigonometry, geometry, calculus, logarithm, and many others. It aims to provide practice-based learning to improve the knowledge gap and help students develop their problem-solving skills. The teaching methods and learning modules in the Cuemath online platform are designed to create an environment that makes students more interested and involved. As students get to learn the concept and apply their knowledge to solve problems, they become more motivated and engaged in learning.

What are Online Facilities?

  • Online learning platforms have the advantage of flexibility and convenience because they don’t require face-to-face interaction. Students and teachers interact on an online platform with the help of digital tools and techniques. The use of audio, video, and conference facilities in online classes allows students and teachers to enjoy the same experience as in-classroom sessions.
  • The Cuemath online platform provides students user-friendly access to the learning modules which are customized for different standards of students. Cuemath applies innovative and effective learning methodologies that aim to provide a clear understanding of mathematics concepts through real-life easy examples.
  • The Cuemath website gives students an updated view of the programs offered which are relevant to the needs of the students. It acts as a trusted guide for students who look for online facilities for mathematics learning. The learning helps students to develop their analytical thinking and problem-solving skills through regular practice.
  • Cuemath online learning programs allow students to get the benefit of guidance provided by expert teaching faculties. It helps to enhance their knowledge and problem-solving skills for handling assignments in examinations more confidently.

Vertically Opposite Angles: A Pair of Angles That are Opposite to Each Other

When two straight lines intersect each other, four angles are formed at the point of intersection. The two pairs of angles that are formed opposite to each other are called vertically opposite angles. The name “vertical” comes from the term ‘vertex’ where the lines intersect. These angles are formed at the vertex and are opposite to each other, so they are known as vertically opposite angles.

Properties of Vertically Opposite Angles

  • Vertically opposite angles are defined as a pair of angles that are opposite to each other when two straight lines intersect at a point. There are always two vertical angles formed at the point of intersection. The important property of vertical angles is that they are equal to each other. This can be explained by the following example.
  • Let’s consider two straight lines, PQ and RS, that intersect at point O. Then the angles ∠POR and ∠QOS are vertical, and ∠POS and ∠ROQ are also vertical angles. Now, as per straight angle property, we know ∠POR + ∠POS= 180° and also ∠POR + ∠ROQ = 180°. Therefore, it is proved that ∠POS = ∠ROQ. Similarly, using the above theorem, we can prove ∠POR = ∠QOS. So we can conclude that vertically opposite angles are equal to each other.
  • Vertically, opposite angles are not adjacent to each other. They can be either supplementary or complementary.

Want to take an interactive live session for your child, Cuemath is the best platform that provides excellent facilities for the students, without any kind of hesitation they can clear their doubts in a two-sided interactive manner.

 

 

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