Bodhint

Applications of as²t AI in Learning & Development

Bodhint Business Research
19 September 2024 | 2 mins read

Artificial intelligence has the power to revolutionize learning and development. With the rapid development of AI tools, there is a belief that educational enterprises will be able to enhance their training and deliver more effective, unique, and impactful experiences.

Asma A Shaikh, Co-Founder & Director of enthral.ai says “AI has enabled the customization of learning paths and content to align with individual learning style”.

AI contributes to multiple aspects of learning and development, such as personalized learning, adjustable delivery of content, decision-making based on data, and virtual mentoring and guidance.

Integrating AI into learning and development brings a wealth of benefits that include Personalized Learning Paths, Adaptive Learning, Content Curation, Increased Engagement, Cost-Effective, Continuous Learning and Development and Skills Gap Analysis.

Cost-Effective

as²t provides a cost-effective learning solution for our educational enterprise user in a range of ways. First, as²t helps decrease the dependency on manual work for tasks like content creation, grading assessment, and support for learners, thereby lowering overall training costs.

In addition, AI personalizes training by providing each person with the appropriate information as per their needs and understanding, thereby minimizing unnecessary spending.

Can you solve this physics question?

A spaceman in training is rotated in a seat at the end of a horizontal rotating arm of length 5.0 m. If he can withstand accelerations of up to 9g, what is the maximum number of revolutions per second permissible?

Here's how to solve this problem:

Understanding the Concepts

Centripetal Acceleration: When an object moves in a circle, it experiences an acceleration towards the center of the circle. This is called centripetal acceleration.
Centripetal Acceleration Formula: a = v²/r, where:
'a' is the centripetal acceleration
'v' is the linear velocity of the object
'r' is the radius of the circular path
Relationship between Angular and Linear Velocity: v = ωr, where:
'ω' is the angular velocity (in radians per second)
'v' is the linear velocity
'r' is the radius

Solving the Problem

Set up the equation: We know the maximum acceleration (9g) and the radius (5.0 m). We need to find the angular velocity (ω) to determine the revolutions per second.

a = 9g = 9 * 9.8 m/s² = 88.2 m/s²
r = 5.0 m

Substitute values into the centripetal acceleration formula:

88.2 m/s² = v²/5.0 m

Solve for linear velocity (v):

v² = 88.2 m/s² * 5.0 m
v = √(441 m²/s²)
v = 21 m/s

Use the relationship between angular and linear velocity:

v = ωr
21 m/s = ω * 5.0 m
ω = 21 m/s / 5.0 m = 4.2 rad/s

Convert angular velocity to revolutions per second:

One revolution is equal to 2π radians.
ω = 4.2 rad/s * (1 revolution / 2π radians) ≈ 0.67 revolutions per second

Answer:

The maximum number of revolutions per second permissible is approximately 0.67 revolutions per second.

AI can also automate time-consuming tasks, such as enrollment, scheduling, and tracking student performance, and progress, allowing learning and development professionals to focus on more strategic efforts such as content development, program evaluation, and learner engagement.

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