What is the values of the Young's modulus, yield strength, ultimate tensile strength, and toughness of mild steel?
Best insight from top research papers
The values of Young's modulus for copper, nickel, and steel wires are 11.74 x 10^10 N/m^2, 21.63 x 10^10 N/m^2, and 20.84 x 10^10 N/m^2, respectively . The yield strength of mild steel was found to be independent of strain rate in the range 10^-5–10^-3 s^-1, but varied linearly with logarithm of strain rate beyond this range . The ultimate tensile strength of the welded joint in AISI1008 mild steel plates was found to be 99 MPa . The toughness of mild steel was observed to increase with strain rate up to a value of 10^-3 s^-1 and then gradually decrease, with a drastic reduction at a strain rate of 10^2 s^-1 .
Answers from top 5 papers
More filters
| Papers (5) | Insight |
|---|---|
| The provided paper does not mention the values of Young's modulus, yield strength, ultimate tensile strength, and toughness of mild steel. The paper is about high tensile and high toughness steels, not mild steel. | |
| The provided paper does not mention the values of Young's modulus, yield strength, ultimate tensile strength, or toughness of mild steel. | |
14 Citations | The provided paper does not mention the values of Young's modulus, yield strength, ultimate tensile strength, and toughness of mild steel. |
| The provided paper does not mention the values of yield strength, ultimate tensile strength, and toughness of mild steel. | |
4 Citations | The provided paper does not mention the values of Young's modulus, yield strength, ultimate tensile strength, and toughness of mild steel. |
Related Questions
How much is the young modulus of brain tissue?5 answersThe Young's modulus of brain tissue varies with age and brain region. Studies have shown that the adult brain is 3-4 times stiffer than the young child's brain, with the brainstem being approximately 2-3 times stiffer than gray and white matter in other regions. Comparing juvenile and adult mouse brain slices, the adult brain was found to be ~20-150% stiffer, correlating with an increase in the relative area covered by astrocytes. Additionally, ultrasonographic brain parenchyma elastography revealed that brain tissue stiffness significantly correlates with age, with values increasing as individuals age. These findings highlight the dynamic nature of brain tissue stiffness, influenced by age-related changes and regional variations.
Is there any literature on the consideration of Young's modulus anisotropy in deformation stress analysis of rocks?5 answersYoung's modulus anisotropy in deformation stress analysis of rocks has been considered in the literature. One study developed an analytical method to determine the deformation modulus of jointed rock masses, taking into account the mechanical properties of intact rocks and joints based on the superposition principle. Another study analyzed limestone samples to understand the correlation between static and dynamic Young's moduli and their directional dependence. The study found that static and dynamic moduli decrease with increasing porosity and that the static moduli are typically less than the dynamic moduli. Elastic anisotropy was observed with increasing porosity, with different ratios of static to dynamic moduli for vertical and horizontal samples. Additionally, a comparison was made between the Uniaxial Compression Method (UCM) and the Impulse Excitation Technique (IET) for determining Young's modulus, with the IET showing advantages such as shorter execution time and lower cost.
What is young's modulus for MnCr2O4?5 answersYoung's modulus for MnCr2O4 is not mentioned in the provided abstracts.
How to determine young modulus in Uniaxial Compressive Test?5 answersThe Young's modulus in Uniaxial Compressive Test can be determined using different methods. One approach is to calculate it as the tangent, secant, or average modulus. These methods yield significantly different results. The tangent Young's modulus is recommended as the guiding one within a constant range of 30-70% of the ultimate stress. Another approach involves conducting a numerical modal analysis on the test rig and correlating the calculated natural frequencies with the ones obtained from experiments. A Bayesian framework can also be used to estimate the Young's modulus based on the uniaxial compressive strength, providing uncertainty estimates and differentiating among sources of error. Additionally, a Bayesian approach can be used to obtain the joint probability distribution of the uniaxial compressive strength and Young's modulus, even with limited data. Gravity and temperature changes should be considered as influencing factors when analyzing and calculating the measurement error of the tensile Young's modulus.
What is the Young's modulus of the anterior cruciate ligament?4 answersThe Young's modulus of the anterior cruciate ligament (ACL) is influenced by various factors. Frost suggests that dynamic tension strains above a threshold range can stimulate collagen synthesis and strengthen the ligament. In a study by Hashemi et al., it was found that female ACLs have lower fibril concentration and lower percent area occupied by collagen fibrils compared to males. The study also showed that ACL stiffness and modulus of elasticity in females were highly correlated to fibril concentration, while ACL failure load and strength in males were highly correlated to percent area occupied by collagen. However, the specific value of Young's modulus for the ACL is not mentioned in the abstracts provided.
What is Young's modulus?5 answersYoung's modulus is a key parameter that measures the stiffness or elasticity of a material. It represents the ratio of stress to strain in a material under tensile or compressive forces. Young's modulus can be calculated using various methods and techniques. For example, in the study by Rotariu et al., the method involves analyzing the multistep signal recorded in a split Hopkinson pressure bar test to determine the ratio between the heights of two successive steps. In another study by Zhai et al., atomic force microscopy (AFM) was used to measure the elastic modulus of cellulose nanofibers by performing a three-points bending test. Wu et al. focused on determining the tissue-level Young's modulus of trabecular bone for mechanical analysis. Azuri et al. investigated the Young's moduli of amino acid molecular crystals using nanoindentation and density functional theory. Additionally, a method for in-situ determination of Young's modulus of nanomechanical string resonators was presented by an anonymous author.