Which Matrix Would You Get If You Multiplied Matrix \[$ A \$\] By A Scalar Of 1.5?Given:$\[ A = \begin{bmatrix} 12 & 6 & 4 \\ 18 & 8 & 10 \end{bmatrix} \\]Calculate The Resulting Matrix:$\[ 1.5 \times A = \begin{bmatrix} 1.5 \times

Introduction

In linear algebra, matrix multiplication is a fundamental operation that involves multiplying two matrices to obtain a new matrix. However, when we multiply a matrix by a scalar, the resulting matrix is obtained by multiplying each element of the original matrix by the scalar. In this article, we will explore the concept of multiplying a matrix by a scalar and calculate the resulting matrix.

What is a Matrix?

A matrix is a rectangular array of numbers, symbols, or expressions, arranged in rows and columns. It is a fundamental concept in linear algebra and is used to represent systems of linear equations, linear transformations, and many other mathematical objects.

Matrix Multiplication with a Scalar

When we multiply a matrix by a scalar, each element of the matrix is multiplied by the scalar. This means that if we have a matrix A and a scalar k, the resulting matrix kA is obtained by multiplying each element of A by k.

Calculating the Resulting Matrix

Given the matrix A:

${ A = \begin{bmatrix} 12 & 6 & 4 \\ 18 & 8 & 10 \end{bmatrix} }$

We want to calculate the resulting matrix when A is multiplied by a scalar of 1.5.

Step 1: Multiply Each Element of A by 1.5

To calculate the resulting matrix, we need to multiply each element of A by 1.5. This means that we will multiply the first element of A (12) by 1.5, the second element of A (6) by 1.5, and so on.

Step 2: Calculate the Resulting Matrix

After multiplying each element of A by 1.5, we get the following resulting matrix:

${ 1.5 \times A = \begin{bmatrix} 1.5 \times 12 & 1.5 \times 6 & 1.5 \times 4 \\ 1.5 \times 18 & 1.5 \times 8 & 1.5 \times 10 \end{bmatrix} }$

${ 1.5 \times A = \begin{bmatrix} 18 & 9 & 6 \\ 27 & 12 & 15 \end{bmatrix} }$

Conclusion

In this article, we explored the concept of multiplying a matrix by a scalar and calculated the resulting matrix. We saw that when a matrix A is multiplied by a scalar k, each element of A is multiplied by k. We applied this concept to the given matrix A and calculated the resulting matrix when A is multiplied by a scalar of 1.5.

Matrix Multiplication with a Scalar: Key Takeaways

• When a matrix A is multiplied by a scalar k, each element of A is multiplied by k.
• The resulting matrix kA is obtained by multiplying each element of A by k.
• Matrix multiplication with a scalar is a fundamental operation in linear algebra.

Real-World Applications of Matrix Multiplication with a Scalar

Matrix multiplication with a scalar has many real-world applications in fields such as:

• Computer Graphics: Matrix multiplication with a scalar is used to perform transformations on 2D and 3D objects, such as scaling, rotating, and translating.
• Machine Learning: Matrix multiplication with a scalar is used in machine learning algorithms, such as neural networks, to perform operations such as scaling and normalizing data.
• Data Analysis: Matrix multiplication with a scalar is used in data analysis to perform operations such as scaling and normalizing data.

Conclusion

Frequently Asked Questions

In this article, we will answer some frequently asked questions about matrix multiplication with a scalar.

Q: What is matrix multiplication with a scalar?

A: Matrix multiplication with a scalar is a fundamental operation in linear algebra that involves multiplying each element of a matrix by a scalar.

Q: How do I multiply a matrix by a scalar?

A: To multiply a matrix by a scalar, you need to multiply each element of the matrix by the scalar. This means that if you have a matrix A and a scalar k, the resulting matrix kA is obtained by multiplying each element of A by k.

Q: What is the resulting matrix when a matrix is multiplied by a scalar?

A: The resulting matrix when a matrix is multiplied by a scalar is obtained by multiplying each element of the original matrix by the scalar. This means that if you have a matrix A and a scalar k, the resulting matrix kA is obtained by multiplying each element of A by k.

Q: Can I multiply a matrix by a negative scalar?

A: Yes, you can multiply a matrix by a negative scalar. When you multiply a matrix by a negative scalar, each element of the matrix is multiplied by the negative scalar.

Q: Can I multiply a matrix by a fraction?

A: Yes, you can multiply a matrix by a fraction. When you multiply a matrix by a fraction, each element of the matrix is multiplied by the fraction.

Q: What is the difference between matrix multiplication and matrix multiplication with a scalar?

A: The main difference between matrix multiplication and matrix multiplication with a scalar is that matrix multiplication involves multiplying two matrices to obtain a new matrix, while matrix multiplication with a scalar involves multiplying each element of a matrix by a scalar.

Q: When would I use matrix multiplication with a scalar?

A: You would use matrix multiplication with a scalar when you need to perform operations such as scaling, rotating, or translating a matrix. Matrix multiplication with a scalar is also used in machine learning algorithms, data analysis, and computer graphics.

Q: Can I use matrix multiplication with a scalar to perform operations such as addition and subtraction?

A: No, you cannot use matrix multiplication with a scalar to perform operations such as addition and subtraction. Matrix multiplication with a scalar is used to perform operations such as scaling, rotating, and translating a matrix.

Q: Can I multiply a matrix by a vector?

A: No, you cannot multiply a matrix by a vector. Matrix multiplication involves multiplying two matrices to obtain a new matrix, while vector multiplication involves multiplying a vector by a scalar.

Conclusion

In conclusion, matrix multiplication with a scalar is a fundamental operation in linear algebra that has many real-world applications. We answered some frequently asked questions about matrix multiplication with a scalar and provided examples of when to use this operation.

Matrix Multiplication with a Scalar: Key Takeaways

• Matrix multiplication with a scalar involves multiplying each element of a matrix by a scalar.
• The resulting matrix when a matrix is multiplied by a scalar is obtained by multiplying each element of the original matrix by the scalar.
• Matrix multiplication with a scalar is used to perform operations such as scaling, rotating, and translating a matrix.
• Matrix multiplication with a scalar is used in machine learning algorithms, data analysis, and computer graphics.

Real-World Applications of Matrix Multiplication with a Scalar

Matrix multiplication with a scalar has many real-world applications in fields such as:

• Computer Graphics: Matrix multiplication with a scalar is used to perform transformations on 2D and 3D objects, such as scaling, rotating, and translating.
• Machine Learning: Matrix multiplication with a scalar is used in machine learning algorithms, such as neural networks, to perform operations such as scaling and normalizing data.
• Data Analysis: Matrix multiplication with a scalar is used in data analysis to perform operations such as scaling and normalizing data.

Conclusion

In conclusion, matrix multiplication with a scalar is a fundamental operation in linear algebra that has many real-world applications. We answered some frequently asked questions about matrix multiplication with a scalar and provided examples of when to use this operation.