Products related to Function:
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Targus DOCK171EUZ Notebook Docking Station, Universal incl. Kensington lock, incl. charging function
Targus DOCK171EUZ Notebook Docking Station The Targus Universal Dual Video Docking Station allows you to plug just one USB cable into your laptop, and the dock instantly connects it to your external monitors and computer accessories. Our Universal Docking Station is compatible with most major laptop brands and models and even has an integrated laptop charger that supports most 90W laptops. With a dock, you save time and don't have to deal with a tangle of cables every time you want to use or move your laptop. Perfect for use with multiple devices and users, home or office, hot desk environments and suitable for Gigabit Ethernet networks. 3 year warranty as standard. Includes power spikes*: H - Dell H2 - HP L - Acer, Asus, Samsung HP - Compaq, Asus (Legacy) R - Lenovo, IBM (Older Models) Z - Asus, Acer (New) X9 - Lenovo (New) * This list reflects the latest specification. Product specifications (such as included power tips) are subject to change without notice. Other power tip types are available through customer service. Supplied with Universal USB-A 3.0 DV Docking Station with Power Supply Keywords Targus, DOCK171EUZ, Universal USB-A 3.0 DV Docking Station with Charging, Docking Station, Dock, Docking The Universal USB 3.0 DV Docking Station lets you set up a dual beyond HD video workstation or connect a single 2K monitor. It offers built-in power and charging and is designed to support multiple host platforms and brands for broad peripheral and device compatibility. Easily customize your workstation with five USB 3.0 ports (including a high-performance port for charging devices and a Type-C port) and an audio in/out port for speakers, microphones, or headphones. The built-in Gigabit Ethernet connection is more secure and faster than most Wi-Fi connections. The included charging adapters can power most popular notebook brands and are neatly stored in a removable compartment in the dock. - Supports two monitors up to 2048 x 1152 at 60 Hz and 24 bpp color video (a single 2K HDMI monitor at 2560 x 1440 at 50 Hz) by leveraging DisplayLink® DL-3900 technology - HDMI 1.4 port can be converted to a second DVI-D port, DVI-I port can be converted to VGA (adapter not included) - 4 USB 3.0 Type-A ports (right side BC 1.2 fast charging up to 1.5A) Multiple Monitors Delivers excellent 2K resolution (2048 x 1152) on one monitor and better than HD on two external monitors without image distortion or lag. Laptop Charger No longer do you need a separate laptop charger as multiple laptop power ports are conveniently housed in the dock, allowing you to power your laptop through the dock itself. Take your original laptop charger with you on the road. More USB ports 1 USB-C port and 4 more USB-A ports to plug in all your computer accessories; a headset, wireless mouse and keyboard, phone charger, there's even a port for fast charging. 3 Year Warranty High quality is our standard, that's why we offer a 3 year warranty on all our Universal Docks USB-C Compatible If you want to future-proof this dock, simply add a Targus Multiplexer, which also allows you to connect USB-C laptops and devices to your existing monitors and computer accessories. Specifications Works With PCs, Macs, and Android Devices Colour Black Ethernet 1x Gigabit Ethernet Port USB 5 x USB ports, 1x USB-C, 4x USB-A - 1x Powered for fast-charging Audio 1x Audio In/Out Port Operating System Windows® 10, Windows® 8.1, Windows® 8, Windows® 7 / Mac OS® X v10.8, v10.9, v10.10 / Android v5 or later USB Port (USB 3.0 recommended) Dimensions 21 x 12.5 x 5 cm Weight 1.62 kg Warranty Limited 3-Year Warranty EAN 5051794021684 Country of Origin China
Price: 157.11 £ | Shipping*: 4.21 £ -
Beam Analysis Tool
Beam Analysis Tool Analyze Deflection & Stresses Simplifies analysis configuration Speeds the learning process Facilities change management Accelerated ROI Beam Analysis Tool provides complete analysis of deflection and stresses caused by direct forces on simply supported beams. Its intuitive interface enables immediate productivity, while more advanced features allow great flexibility in problem definition.
Price: 117.82 £ | Shipping*: 0.00 £
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What is the parameter question in the function analysis?
The parameter question in function analysis refers to understanding how changes in the parameters of a function affect its behavior and properties. This involves investigating how variations in the parameters impact the graph, domain, range, and other characteristics of the function. By studying the parameter question, mathematicians can gain insights into the relationships between different functions and how they are influenced by specific parameters.
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What is a job and function analysis?
A job and function analysis is a systematic process of gathering, documenting, and analyzing information about a particular job or role within an organization. This analysis typically involves identifying the tasks, responsibilities, and requirements of the job, as well as the knowledge, skills, and abilities needed to perform it effectively. The purpose of a job and function analysis is to provide a clear understanding of what the job entails, and to use this information for various HR functions such as recruitment, performance evaluation, training, and job design.
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How can one construct a function without critical points?
One way to construct a function without critical points is to create a function that is either strictly increasing or strictly decreasing over its entire domain. This can be achieved by using simple functions like linear functions or exponential functions. By ensuring that the function does not have any local maxima or minima, critical points can be avoided. Additionally, functions that are constant over their domain will also not have any critical points.
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What is the analysis of the exponential function?
The exponential function is a mathematical function of the form f(x) = a^x, where 'a' is a constant and 'x' is the variable. This function grows or decays at a rate proportional to its current value, making it useful in modeling processes that exhibit exponential growth or decay. The key properties of the exponential function include rapid growth for a > 1, decay for 0 < a < 1, and the horizontal asymptote at y = 0 for a > 1. Additionally, the derivative of the exponential function is proportional to the function itself, making it unique among functions.
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What is the analysis of the e-function?
The e-function, also known as the exponential function, is a fundamental mathematical function that is defined as f(x) = e^x, where e is the base of the natural logarithm (approximately 2.71828). The analysis of the e-function involves studying its properties and behavior, such as its growth rate, domain and range, and its relationship to the natural logarithm function. The e-function is known for its unique property of growing at a rate proportional to its current value, making it a key function in modeling exponential growth and decay phenomena. Additionally, the e-function is used extensively in calculus and mathematical modeling due to its special properties and applications in various fields such as finance, biology, and physics.
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How does the function Linear Algebra Analysis work?
Linear Algebra Analysis is a mathematical tool that is used to analyze and solve systems of linear equations and study the properties of linear transformations. It involves the use of matrices, vectors, and linear transformations to understand the behavior of linear systems. By performing operations such as matrix multiplication, finding eigenvalues and eigenvectors, and solving systems of linear equations, Linear Algebra Analysis helps in understanding the relationships and patterns within linear systems. This function is widely used in various fields such as engineering, physics, computer science, and economics to model and solve real-world problems.
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How can one construct a function without any critical points?
One way to construct a function without any critical points is to choose a function that is either strictly increasing or strictly decreasing over its entire domain. This means that the function's derivative will never be equal to zero, and therefore there will be no critical points. For example, the function f(x) = x^3 is strictly increasing for all real numbers x, and its derivative f'(x) = 3x^2 is never equal to zero. Therefore, f(x) = x^3 has no critical points. Similarly, the function g(x) = -x^2 is strictly decreasing for all real numbers x, and its derivative g'(x) = -2x is also never equal to zero. Therefore, g(x) = -x^2 has no critical points. In general, any function that is strictly increasing or strictly decreasing over its entire domain will not have any critical points.
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What are the critical points of this 4th degree function?
The critical points of a 4th degree function occur where the derivative of the function is equal to zero or undefined. To find the critical points, we need to take the derivative of the 4th degree function and set it equal to zero. Once we solve for the values of the independent variable that make the derivative zero, we can then determine the corresponding values of the function at those points. These points are the critical points of the 4th degree function.
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